A Real-World Example with Python

In today’s interconnected global economy, supply chain optimization has evolved beyond simple cost minimization. Companies must now consider geopolitical risks, trade tensions, and regional instabilities when designing their supply networks. This blog post explores a comprehensive approach to supply chain geopolitical optimization using Python, complete with mathematical modeling and visualization.

The Problem: Global Electronics Supply Chain

Let’s consider a multinational electronics company that needs to optimize its supply chain while accounting for geopolitical risks. The company sources components from multiple regions and serves global markets, but faces various challenges including trade wars, sanctions, and regional conflicts.

Mathematical Model

We’ll formulate this as a multi-objective optimization problem that balances:

1. Cost minimization: Traditional logistics costs
2. Risk mitigation: Geopolitical stability considerations
3. Resilience maximization: Supply chain diversification

The objective function can be expressed as:

minZ=α∑i,j,kcijkxijk+β∑i,j,krijkxijk−γ∑jDj

Where:

• xijk: Flow from supplier i to customer j through facility k
• cijk: Unit cost of transportation and production
• rijk: Geopolitical risk score
• Dj: Diversification index for customer j
• α,β,γ: Weight parameters

Subject to constraints:
∑i,kxijk=dj∀j

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import numpy as np
import pandas as pd
import matplotlib.pyplot as plt
import seaborn as sns
from scipy.optimize import minimize
from itertools import product
import warnings
warnings.filterwarnings('ignore')

# Set style for better visualization
plt.style.use('seaborn-v0_8')
sns.set_palette("husl")

class SupplyChainOptimizer:
    def __init__(self):
        """
        Initialize the Supply Chain Geopolitical Optimizer
        """
        # Define regions and their geopolitical risk scores (1-10, higher = more risky)
        self.suppliers = {
            'China': {'capacity': 1000, 'cost_base': 1.0, 'risk': 6.5},
            'Vietnam': {'capacity': 600, 'cost_base': 1.2, 'risk': 4.0},
            'Taiwan': {'capacity': 800, 'cost_base': 1.1, 'risk': 7.0},
            'South Korea': {'capacity': 700, 'cost_base': 1.3, 'risk': 3.5},
            'India': {'capacity': 500, 'cost_base': 1.1, 'risk': 4.5}
        }
        
        self.customers = {
            'USA': {'demand': 800, 'region': 'Americas'},
            'Germany': {'demand': 600, 'region': 'Europe'},
            'Japan': {'demand': 500, 'region': 'Asia'},
            'UK': {'demand': 400, 'region': 'Europe'},
            'Brazil': {'demand': 300, 'region': 'Americas'}
        }
        
        self.facilities = {
            'Singapore Hub': {'capacity': 1200, 'region': 'Asia', 'cost_mult': 1.0},
            'Netherlands Hub': {'capacity': 800, 'region': 'Europe', 'cost_mult': 1.1},
            'USA Hub': {'capacity': 1000, 'region': 'Americas', 'cost_mult': 1.05}
        }
        
        # Distance matrix for transportation costs (normalized)
        self.distances = self._create_distance_matrix()
        
        # Weight parameters for multi-objective optimization
        self.alpha = 0.4  # Cost weight
        self.beta = 0.4   # Risk weight
        self.gamma = 0.2  # Diversification weight
        
    def _create_distance_matrix(self):
        """Create a normalized distance matrix for transportation costs"""
        # Simplified distance matrix (in practice, use actual distances)
        suppliers = list(self.suppliers.keys())
        facilities = list(self.facilities.keys())
        customers = list(self.customers.keys())
        
        # Create distance matrices
        sup_to_fac = np.random.uniform(0.8, 2.0, (len(suppliers), len(facilities)))
        fac_to_cust = np.random.uniform(0.5, 1.5, (len(facilities), len(customers)))
        
        # Set realistic distances based on geography
        # Asia suppliers to Singapore Hub should be cheaper
        sup_to_fac[0:3, 0] *= 0.6  # China, Vietnam, Taiwan to Singapore
        sup_to_fac[3, 0] *= 0.7    # South Korea to Singapore
        
        return {'sup_to_fac': sup_to_fac, 'fac_to_cust': fac_to_cust}
    
    def calculate_total_cost(self, solution):
        """
        Calculate total logistics cost for a given solution
        """
        suppliers = list(self.suppliers.keys())
        facilities = list(self.facilities.keys())
        customers = list(self.customers.keys())
        
        total_cost = 0
        idx = 0
        
        for i, supplier in enumerate(suppliers):
            for j, customer in enumerate(customers):
                for k, facility in enumerate(facilities):
                    if idx < len(solution):
                        flow = solution[idx]
                        
                        # Calculate transportation cost
                        transport_cost = (self.distances['sup_to_fac'][i, k] + 
                                        self.distances['fac_to_cust'][k, j])
                        
                        # Add base production cost
                        production_cost = self.suppliers[supplier]['cost_base']
                        
                        # Add facility cost multiplier
                        facility_cost = self.facilities[facility]['cost_mult']
                        
                        total_cost += flow * transport_cost * production_cost * facility_cost
                        idx += 1
        
        return total_cost
    
    def calculate_risk_score(self, solution):
        """
        Calculate total geopolitical risk score
        """
        suppliers = list(self.suppliers.keys())
        facilities = list(self.facilities.keys())
        customers = list(self.customers.keys())
        
        total_risk = 0
        idx = 0
        
        for i, supplier in enumerate(suppliers):
            for j, customer in enumerate(customers):
                for k, facility in enumerate(facilities):
                    if idx < len(solution):
                        flow = solution[idx]
                        risk = self.suppliers[supplier]['risk']
                        
                        # Add facility region risk (simplified)
                        facility_region_risk = {'Asia': 1.2, 'Europe': 0.8, 'Americas': 1.0}
                        fac_risk = facility_region_risk[self.facilities[facility]['region']]
                        
                        total_risk += flow * risk * fac_risk
                        idx += 1
        
        return total_risk
    
    def calculate_diversification(self, solution):
        """
        Calculate supply diversification score (higher = more diverse)
        """
        suppliers = list(self.suppliers.keys())
        facilities = list(self.facilities.keys())
        customers = list(self.customers.keys())
        
        # Calculate Herfindahl-Hirschman Index for each customer
        total_diversification = 0
        idx = 0
        
        for j, customer in enumerate(customers):
            supplier_shares = np.zeros(len(suppliers))
            total_supply = 0
            
            for i, supplier in enumerate(suppliers):
                for k, facility in enumerate(facilities):
                    if idx < len(solution):
                        flow = solution[idx]
                        supplier_shares[i] += flow
                        total_supply += flow
                        idx += 1
            
            if total_supply > 0:
                supplier_shares /= total_supply
                # Calculate diversity index (1 - HHI)
                hhi = np.sum(supplier_shares ** 2)
                diversity = 1 - hhi
                total_diversification += diversity * self.customers[customer]['demand']
        
        return total_diversification
    
    def objective_function(self, solution):
        """
        Multi-objective function combining cost, risk, and diversification
        """
        cost = self.calculate_total_cost(solution)
        risk = self.calculate_risk_score(solution)
        diversification = self.calculate_diversification(solution)
        
        # Normalize components (simplified normalization)
        normalized_cost = cost / 10000
        normalized_risk = risk / 10000
        normalized_diversification = diversification / 1000
        
        objective = (self.alpha * normalized_cost + 
                    self.beta * normalized_risk - 
                    self.gamma * normalized_diversification)
        
        return objective
    
    def create_constraints(self):
        """
        Create constraint functions for the optimization
        """
        suppliers = list(self.suppliers.keys())
        facilities = list(self.facilities.keys())
        customers = list(self.customers.keys())
        
        constraints = []
        
        # Demand satisfaction constraints
        for j, customer in enumerate(customers):
            def demand_constraint(solution, customer_idx=j):
                total_received = 0
                idx = 0
                for i in range(len(suppliers)):
                    for cust_idx in range(len(customers)):
                        for k in range(len(facilities)):
                            if cust_idx == customer_idx and idx < len(solution):
                                total_received += solution[idx]
                            idx += 1
                return self.customers[list(customers)[customer_idx]]['demand'] - total_received
            
            constraints.append({'type': 'eq', 'fun': demand_constraint})
        
        # Supply capacity constraints
        for i, supplier in enumerate(suppliers):
            def supply_constraint(solution, supplier_idx=i):
                total_supplied = 0
                idx = 0
                for sup_idx in range(len(suppliers)):
                    for j in range(len(customers)):
                        for k in range(len(facilities)):
                            if sup_idx == supplier_idx and idx < len(solution):
                                total_supplied += solution[idx]
                            idx += 1
                return self.suppliers[list(suppliers)[supplier_idx]]['capacity'] - total_supplied
            
            constraints.append({'type': 'ineq', 'fun': supply_constraint})
        
        return constraints
    
    def optimize(self):
        """
        Perform the optimization
        """
        n_vars = len(self.suppliers) * len(self.customers) * len(self.facilities)
        
        # Initial guess
        x0 = np.random.uniform(0, 100, n_vars)
        
        # Bounds (non-negative flows)
        bounds = [(0, None) for _ in range(n_vars)]
        
        # Constraints
        constraints = self.create_constraints()
        
        # Solve optimization
        result = minimize(
            self.objective_function,
            x0,
            method='SLSQP',
            bounds=bounds,
            constraints=constraints,
            options={'maxiter': 1000, 'disp': True}
        )
        
        return result
    
    def analyze_solution(self, solution):
        """
        Analyze and visualize the optimal solution
        """
        suppliers = list(self.suppliers.keys())
        facilities = list(self.facilities.keys())
        customers = list(self.customers.keys())
        
        # Create solution matrix
        flow_matrix = np.zeros((len(suppliers), len(customers), len(facilities)))
        idx = 0
        
        for i in range(len(suppliers)):
            for j in range(len(customers)):
                for k in range(len(facilities)):
                    if idx < len(solution):
                        flow_matrix[i, j, k] = max(0, solution[idx])
                        idx += 1
        
        # Calculate metrics
        total_cost = self.calculate_total_cost(solution)
        risk_score = self.calculate_risk_score(solution)
        diversification = self.calculate_diversification(solution)
        
        print(f"Optimization Results:")
        print(f"Total Cost: {total_cost:.2f}")
        print(f"Risk Score: {risk_score:.2f}")
        print(f"Diversification Index: {diversification:.2f}")
        print(f"Combined Objective: {self.objective_function(solution):.2f}")
        
        return flow_matrix, {'cost': total_cost, 'risk': risk_score, 'diversification': diversification}
    
    def visualize_results(self, flow_matrix, metrics):
        """
        Create comprehensive visualizations of the results
        """
        suppliers = list(self.suppliers.keys())
        facilities = list(self.facilities.keys())
        customers = list(self.customers.keys())
        
        fig, axes = plt.subplots(2, 3, figsize=(20, 12))
        fig.suptitle('Supply Chain Geopolitical Optimization Results', fontsize=16, fontweight='bold')
        
        # 1. Supplier utilization
        supplier_utilization = np.sum(flow_matrix, axis=(1, 2))
        supplier_capacity = [self.suppliers[s]['capacity'] for s in suppliers]
        utilization_rate = supplier_utilization / supplier_capacity * 100
        
        axes[0, 0].bar(suppliers, utilization_rate, color='skyblue', edgecolor='navy')
        axes[0, 0].set_title('Supplier Utilization Rate (%)')
        axes[0, 0].set_ylabel('Utilization (%)')
        axes[0, 0].tick_params(axis='x', rotation=45)
        
        # 2. Customer supply sources
        customer_supply = np.sum(flow_matrix, axis=2).T
        bottom = np.zeros(len(customers))
        colors = plt.cm.Set3(np.linspace(0, 1, len(suppliers)))
        
        for i, supplier in enumerate(suppliers):
            axes[0, 1].bar(customers, customer_supply[:, i], bottom=bottom, 
                          label=supplier, color=colors[i])
            bottom += customer_supply[:, i]
        
        axes[0, 1].set_title('Customer Supply Sources')
        axes[0, 1].set_ylabel('Supply Volume')
        axes[0, 1].legend(bbox_to_anchor=(1.05, 1), loc='upper left')
        axes[0, 1].tick_params(axis='x', rotation=45)
        
        # 3. Facility throughput
        facility_throughput = np.sum(flow_matrix, axis=(0, 1))
        facility_capacity = [self.facilities[f]['capacity'] for f in facilities]
        
        x = np.arange(len(facilities))
        width = 0.35
        axes[0, 2].bar(x - width/2, facility_throughput, width, label='Throughput', color='lightgreen')
        axes[0, 2].bar(x + width/2, facility_capacity, width, label='Capacity', color='lightcoral')
        axes[0, 2].set_title('Facility Throughput vs Capacity')
        axes[0, 2].set_ylabel('Volume')
        axes[0, 2].set_xticks(x)
        axes[0, 2].set_xticklabels(facilities, rotation=45)
        axes[0, 2].legend()
        
        # 4. Risk vs Cost scatter
        supplier_costs = []
        supplier_risks = []
        supplier_volumes = []
        
        for i, supplier in enumerate(suppliers):
            volume = np.sum(flow_matrix[i, :, :])
            cost = self.suppliers[supplier]['cost_base'] * volume
            risk = self.suppliers[supplier]['risk'] * volume
            
            supplier_costs.append(cost)
            supplier_risks.append(risk)
            supplier_volumes.append(volume)
        
        scatter = axes[1, 0].scatter(supplier_costs, supplier_risks, 
                                   s=[v/5 for v in supplier_volumes], 
                                   c=range(len(suppliers)), cmap='viridis', alpha=0.7)
        axes[1, 0].set_title('Risk vs Cost by Supplier')
        axes[1, 0].set_xlabel('Cost Impact')
        axes[1, 0].set_ylabel('Risk Impact')
        
        # Add supplier labels
        for i, supplier in enumerate(suppliers):
            axes[1, 0].annotate(supplier, (supplier_costs[i], supplier_risks[i]),
                              xytext=(5, 5), textcoords='offset points', fontsize=8)
        
        # 5. Geographic distribution
        facility_flows = {}
        for k, facility in enumerate(facilities):
            facility_flows[facility] = np.sum(flow_matrix[:, :, k])
        
        axes[1, 1].pie(facility_flows.values(), labels=facility_flows.keys(), autopct='%1.1f%%')
        axes[1, 1].set_title('Geographic Distribution of Flows')
        
        # 6. Metrics comparison
        metrics_names = ['Cost\n(normalized)', 'Risk\n(normalized)', 'Diversification\n(normalized)']
        metrics_values = [
            metrics['cost'] / 10000,
            metrics['risk'] / 10000,
            metrics['diversification'] / 1000
        ]
        
        colors_metrics = ['red', 'orange', 'green']
        bars = axes[1, 2].bar(metrics_names, metrics_values, color=colors_metrics, alpha=0.7)
        axes[1, 2].set_title('Optimization Metrics')
        axes[1, 2].set_ylabel('Normalized Value')
        
        # Add value labels on bars
        for bar, value in zip(bars, metrics_values):
            height = bar.get_height()
            axes[1, 2].text(bar.get_x() + bar.get_width()/2., height + 0.01,
                           f'{value:.3f}', ha='center', va='bottom')
        
        plt.tight_layout()
        plt.show()
        
        # Additional heatmap for flow matrix
        self.create_flow_heatmap(flow_matrix)
    
    def create_flow_heatmap(self, flow_matrix):
        """
        Create a detailed heatmap of flows
        """
        suppliers = list(self.suppliers.keys())
        facilities = list(self.facilities.keys())
        customers = list(self.customers.keys())
        
        fig, axes = plt.subplots(1, len(facilities), figsize=(18, 6))
        fig.suptitle('Flow Distribution Heatmaps by Facility', fontsize=14, fontweight='bold')
        
        for k, facility in enumerate(facilities):
            flow_data = flow_matrix[:, :, k]
            
            im = axes[k].imshow(flow_data, cmap='YlOrRd', aspect='auto')
            axes[k].set_title(f'{facility}')
            axes[k].set_xlabel('Customers')
            axes[k].set_ylabel('Suppliers')
            axes[k].set_xticks(range(len(customers)))
            axes[k].set_yticks(range(len(suppliers)))
            axes[k].set_xticklabels(customers, rotation=45)
            axes[k].set_yticklabels(suppliers)
            
            # Add text annotations
            for i in range(len(suppliers)):
                for j in range(len(customers)):
                    text = axes[k].text(j, i, f'{flow_data[i, j]:.0f}',
                                      ha="center", va="center", color="black", fontsize=8)
            
            plt.colorbar(im, ax=axes[k], shrink=0.8)
        
        plt.tight_layout()
        plt.show()

# Run the optimization
def main():
    print("Supply Chain Geopolitical Optimization")
    print("="*50)
    
    # Initialize optimizer
    optimizer = SupplyChainOptimizer()
    
    print("\nProblem Setup:")
    print(f"Suppliers: {list(optimizer.suppliers.keys())}")
    print(f"Customers: {list(optimizer.customers.keys())}")
    print(f"Facilities: {list(optimizer.facilities.keys())}")
    print(f"Optimization weights - Cost: {optimizer.alpha}, Risk: {optimizer.beta}, Diversification: {optimizer.gamma}")
    
    # Perform optimization
    print("\nPerforming optimization...")
    result = optimizer.optimize()
    
    if result.success:
        print(f"\nOptimization successful!")
        print(f"Iterations: {result.nit}")
        print(f"Function evaluations: {result.nfev}")
        
        # Analyze results
        flow_matrix, metrics = optimizer.analyze_solution(result.x)
        
        # Create visualizations
        print("\nGenerating visualizations...")
        optimizer.visualize_results(flow_matrix, metrics)
        
    else:
        print(f"\nOptimization failed: {result.message}")
        
    return optimizer, result

# Execute the main function
if __name__ == "__main__":
    optimizer, result = main()

Code Explanation

Let me break down the key components of this comprehensive supply chain optimization solution:

1. Class Structure and Initialization

The SupplyChainOptimizer class encapsulates our entire optimization framework. In the __init__ method, we define:

• Suppliers: Each with capacity, base cost, and geopolitical risk score
• Customers: With demand requirements and regional classification
• Facilities: Distribution hubs with capacity and cost multipliers
• Weight parameters: α, β, γ for balancing objectives

2. Objective Function Components

The code implements three key metrics:

Cost Calculation (calculate_total_cost):

• Combines transportation costs (supplier → facility → customer)
• Includes production costs and facility operation costs
• Uses distance matrices for realistic cost modeling

Risk Assessment (calculate_risk_score):

• Incorporates supplier-specific geopolitical risk scores
• Adds facility regional risk multipliers
• Weights risk by flow volume through each path

Diversification Index (calculate_diversification):

• Calculates supply source diversity for each customer
• Uses the inverse of Herfindahl-Hirschman Index: HHI=∑is2i
• Where si is the share of supplier i in total supply

3. Constraint Implementation

The optimization includes two critical constraint types:

Demand Satisfaction:
∑i,kxijk=dj∀j

Supply Capacity:
∑j,kxijk≤si∀i

These are implemented as equality and inequality constraints respectively in the create_constraints method.

4. Visualization Framework

The solution includes six comprehensive visualizations:

1. Supplier Utilization: Shows capacity usage rates
2. Customer Supply Sources: Stacked bar chart showing supply diversity
3. Facility Throughput: Compares actual vs. capacity usage
4. Risk vs Cost Scatter: Plots the trade-off between these objectives
5. Geographic Distribution: Pie chart of facility usage
6. Metrics Comparison: Bar chart of normalized objective components

Expected Results and Analysis

Supply Chain Geopolitical Optimization
==================================================

Problem Setup:
Suppliers: ['China', 'Vietnam', 'Taiwan', 'South Korea', 'India']
Customers: ['USA', 'Germany', 'Japan', 'UK', 'Brazil']
Facilities: ['Singapore Hub', 'Netherlands Hub', 'USA Hub']
Optimization weights - Cost: 0.4, Risk: 0.4, Diversification: 0.2

Performing optimization...
Optimization terminated successfully    (Exit mode 0)
            Current function value: 0.441228901428963
            Iterations: 2
            Function evaluations: 152
            Gradient evaluations: 2

Optimization successful!
Iterations: 2
Function evaluations: 152
Optimization Results:
Total Cost: 7387.99
Risk Score: 13415.70
Diversification Index: 1954.59
Combined Objective: 0.44

Generating visualizations...

When you run this optimization, you should expect to see:

Trade-off Insights

• Higher-risk, lower-cost suppliers (like China) will be used more when cost weight (α) is higher
• Lower-risk suppliers (like South Korea) gain prominence when risk weight (β) increases
• Facility selection will favor geographically distributed hubs for better resilience

Geopolitical Considerations

The model captures realistic scenarios such as:

• Trade war impacts: Higher risk scores for certain supplier-customer combinations
• Regional conflicts: Increased costs for routes through unstable regions
• Supply diversification: Avoiding over-dependence on single suppliers

Optimization Outcomes

The solution will typically show:

• Balanced sourcing: No single supplier dominates unless costs strongly favor them
• Strategic facility usage: Singapore hub for Asia-Pacific, Netherlands for Europe
• Risk-adjusted flows: Higher-risk suppliers get proportionally less allocation

Mathematical Insights

The multi-objective formulation ensures that:

∇Z=α∇C+β∇R−γ∇D=0

At optimality, meaning the marginal trade-offs between cost, risk, and diversification are balanced according to the weight parameters.

The diversification term acts as a “regularization” that prevents solution from concentrating on few suppliers, similar to portfolio optimization in finance.

This comprehensive approach provides supply chain managers with actionable insights for building resilient, cost-effective, and geopolitically-aware supply networks. The Python implementation makes it easy to adjust parameters and explore different scenarios as global conditions evolve.

A Game-Theoretic Approach

Economic sanctions are powerful diplomatic tools that require careful strategic planning to maximize their effectiveness while minimizing unintended consequences. Today, we’ll explore how to optimize sanctions strategy using game theory and Python, examining a real-world scenario involving multiple countries and economic relationships.

The Problem: Multi-Country Sanctions Optimization

Let’s consider a scenario where Country A (the sanctioning country) is deciding how to allocate sanctions across multiple sectors of Country B (the target country), while accounting for the responses of neutral countries and the economic interdependencies.

Our objective is to maximize the economic pressure on Country B while minimizing the cost to Country A and avoiding backlash from neutral countries.

Mathematical Formulation

The optimization problem can be formulated as:

maxxin∑i=1wi⋅xi⋅ei−n∑i=1ci⋅x2i−m∑j=1pj⋅rj(x)

Where:

• xi = sanctions intensity on sector i (0 ≤ xi ≤ 1)
• wi = weight of sector i in target country’s economy
• ei = effectiveness coefficient for sector i
• ci = cost coefficient for sanctioning sector i
• pj = penalty from neutral country j
• rj(x) = response function of neutral country j

Subject to:
n∑i=1xi≤B

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import numpy as np
import matplotlib.pyplot as plt
from scipy.optimize import minimize, LinearConstraint
import seaborn as sns
from mpl_toolkits.mplot3d import Axes3D
import pandas as pd

# Set up the problem parameters
np.random.seed(42)  # For reproducible results

class SanctionsOptimizer:
    def __init__(self, n_sectors=5, n_neutral_countries=3):
        self.n_sectors = n_sectors
        self.n_neutral_countries = n_neutral_countries
        
        # Define sectors (example: Oil, Banking, Technology, Manufacturing, Agriculture)
        self.sectors = ['Oil & Energy', 'Banking', 'Technology', 'Manufacturing', 'Agriculture']
        
        # Economic weights of each sector in target country (normalized)
        self.weights = np.array([0.3, 0.25, 0.2, 0.15, 0.1])
        
        # Effectiveness coefficients (how much damage each sector creates)
        self.effectiveness = np.array([0.8, 0.9, 0.7, 0.6, 0.4])
        
        # Cost coefficients (cost to sanctioning country)
        self.costs = np.array([0.4, 0.2, 0.6, 0.3, 0.1])
        
        # Neutral country penalty coefficients
        self.neutral_penalties = np.array([0.3, 0.2, 0.1])
        
        # Trade interdependency matrix (how much neutral countries care about each sector)
        self.trade_matrix = np.random.rand(self.n_neutral_countries, self.n_sectors) * 0.5
        
        # Budget constraint (total sanctions capacity)
        self.budget = 3.0
    
    def objective_function(self, x):
        """
        Objective function to maximize:
        Benefits - Costs - Neutral country penalties
        
        We minimize the negative of this function
        """
        # Benefits: weighted effectiveness of sanctions
        benefits = np.sum(self.weights * x * self.effectiveness)
        
        # Costs: quadratic cost function (increasing marginal costs)
        costs = np.sum(self.costs * x**2)
        
        # Neutral country penalties (response to sanctions affecting their trade)
        neutral_responses = 0
        for j in range(self.n_neutral_countries):
            # Each neutral country responds based on trade exposure
            trade_exposure = np.sum(self.trade_matrix[j] * x)
            neutral_responses += self.neutral_penalties[j] * trade_exposure**1.5
        
        # Return negative (since we're minimizing)
        return -(benefits - costs - neutral_responses)
    
    def optimize_sanctions(self):
        """
        Solve the optimization problem using scipy
        """
        # Initial guess
        x0 = np.ones(self.n_sectors) * 0.3
        
        # Bounds: sanctions intensity between 0 and 1
        bounds = [(0, 1) for _ in range(self.n_sectors)]
        
        # Budget constraint: sum of x_i <= budget
        constraint = LinearConstraint(np.ones(self.n_sectors), 0, self.budget)
        
        # Solve optimization
        result = minimize(
            self.objective_function,
            x0,
            method='SLSQP',
            bounds=bounds,
            constraints=constraint,
            options={'disp': True}
        )
        
        return result
    
    def analyze_sensitivity(self, base_solution):
        """
        Perform sensitivity analysis on key parameters
        """
        # Test different budget levels
        budgets = np.linspace(1.0, 5.0, 20)
        optimal_values = []
        
        original_budget = self.budget
        
        for budget in budgets:
            self.budget = budget
            constraint = LinearConstraint(np.ones(self.n_sectors), 0, self.budget)
            
            result = minimize(
                self.objective_function,
                base_solution.x,
                method='SLSQP',
                bounds=[(0, 1) for _ in range(self.n_sectors)],
                constraints=constraint,
                options={'disp': False}
            )
            
            optimal_values.append(-result.fun)  # Convert back to positive
        
        self.budget = original_budget  # Restore original budget
        return budgets, optimal_values
    
    def monte_carlo_simulation(self, n_simulations=1000):
        """
        Monte Carlo simulation to account for uncertainty in parameters
        """
        results = []
        
        for _ in range(n_simulations):
            # Add random noise to parameters
            noise_factor = 0.1
            temp_weights = self.weights * (1 + np.random.normal(0, noise_factor, self.n_sectors))
            temp_effectiveness = self.effectiveness * (1 + np.random.normal(0, noise_factor, self.n_sectors))
            temp_costs = self.costs * (1 + np.random.normal(0, noise_factor, self.n_sectors))
            
            # Store original values
            orig_weights, orig_effectiveness, orig_costs = self.weights, self.effectiveness, self.costs
            
            # Update with noisy values
            self.weights, self.effectiveness, self.costs = temp_weights, temp_effectiveness, temp_costs
            
            # Solve optimization
            result = self.optimize_sanctions()
            if result.success:
                results.append(result.x)
            
            # Restore original values
            self.weights, self.effectiveness, self.costs = orig_weights, orig_effectiveness, orig_costs
        
        return np.array(results)

# Initialize and solve the optimization problem
print("=== Economic Sanctions Strategy Optimization ===\n")
optimizer = SanctionsOptimizer()

print("Problem Setup:")
print(f"Sectors: {optimizer.sectors}")
print(f"Economic weights: {optimizer.weights}")
print(f"Effectiveness coefficients: {optimizer.effectiveness}")
print(f"Cost coefficients: {optimizer.costs}")
print(f"Budget constraint: {optimizer.budget}")
print("\n")

# Solve the main optimization problem
print("Solving optimization problem...")
optimal_result = optimizer.optimize_sanctions()

print(f"\nOptimization Result:")
print(f"Success: {optimal_result.success}")
print(f"Optimal objective value: {-optimal_result.fun:.4f}")
print(f"Optimal sanctions allocation:")

for i, (sector, allocation) in enumerate(zip(optimizer.sectors, optimal_result.x)):
    print(f"  {sector}: {allocation:.3f}")

# Perform sensitivity analysis
print("\nPerforming sensitivity analysis...")
budgets, optimal_values = optimizer.analyze_sensitivity(optimal_result)

# Monte Carlo simulation
print("Running Monte Carlo simulation...")
mc_results = optimizer.monte_carlo_simulation(500)

print(f"Monte Carlo completed with {len(mc_results)} successful runs")

# Create comprehensive visualizations
fig = plt.figure(figsize=(20, 15))

# Plot 1: Optimal allocation by sector
ax1 = plt.subplot(3, 3, 1)
bars = plt.bar(optimizer.sectors, optimal_result.x, 
               color=['#1f77b4', '#ff7f0e', '#2ca02c', '#d62728', '#9467bd'])
plt.title('Optimal Sanctions Allocation by Sector', fontsize=14, fontweight='bold')
plt.ylabel('Sanctions Intensity')
plt.xticks(rotation=45, ha='right')
plt.ylim(0, 1)

# Add value labels on bars
for bar, value in zip(bars, optimal_result.x):
    plt.text(bar.get_x() + bar.get_width()/2, bar.get_height() + 0.01, 
             f'{value:.3f}', ha='center', va='bottom', fontweight='bold')

# Plot 2: Economic impact breakdown
ax2 = plt.subplot(3, 3, 2)
impact_data = optimizer.weights * optimal_result.x * optimizer.effectiveness
plt.pie(impact_data, labels=optimizer.sectors, autopct='%1.1f%%', 
        colors=['#1f77b4', '#ff7f0e', '#2ca02c', '#d62728', '#9467bd'])
plt.title('Economic Impact Distribution', fontsize=14, fontweight='bold')

# Plot 3: Cost-benefit analysis
ax3 = plt.subplot(3, 3, 3)
benefits = optimizer.weights * optimal_result.x * optimizer.effectiveness
costs = optimizer.costs * optimal_result.x**2
x_pos = np.arange(len(optimizer.sectors))

plt.bar(x_pos - 0.2, benefits, 0.4, label='Benefits', alpha=0.8, color='green')
plt.bar(x_pos + 0.2, costs, 0.4, label='Costs', alpha=0.8, color='red')
plt.title('Cost-Benefit Analysis by Sector', fontsize=14, fontweight='bold')
plt.xlabel('Sectors')
plt.ylabel('Value')
plt.xticks(x_pos, optimizer.sectors, rotation=45, ha='right')
plt.legend()

# Plot 4: Sensitivity analysis
ax4 = plt.subplot(3, 3, 4)
plt.plot(budgets, optimal_values, 'b-', linewidth=2, marker='o', markersize=4)
plt.axvline(x=optimizer.budget, color='r', linestyle='--', alpha=0.7, 
           label=f'Current Budget ({optimizer.budget})')
plt.title('Sensitivity Analysis: Budget vs Optimal Value', fontsize=14, fontweight='bold')
plt.xlabel('Budget Constraint')
plt.ylabel('Optimal Objective Value')
plt.grid(True, alpha=0.3)
plt.legend()

# Plot 5: Monte Carlo results - box plots
ax5 = plt.subplot(3, 3, 5)
mc_df = pd.DataFrame(mc_results, columns=optimizer.sectors)
plt.boxplot([mc_df[sector] for sector in optimizer.sectors], 
            labels=optimizer.sectors, patch_artist=True)
plt.title('Monte Carlo Simulation Results', fontsize=14, fontweight='bold')
plt.ylabel('Sanctions Intensity')
plt.xticks(rotation=45, ha='right')

# Add mean lines
for i, sector in enumerate(optimizer.sectors):
    mean_val = mc_df[sector].mean()
    plt.axhline(y=mean_val, xmin=(i+0.6)/len(optimizer.sectors), 
                xmax=(i+1.4)/len(optimizer.sectors), color='red', alpha=0.7)

# Plot 6: Trade interdependency heatmap
ax6 = plt.subplot(3, 3, 6)
neutral_countries = [f'Country {i+1}' for i in range(optimizer.n_neutral_countries)]
sns.heatmap(optimizer.trade_matrix, 
            xticklabels=optimizer.sectors, 
            yticklabels=neutral_countries,
            annot=True, fmt='.2f', cmap='YlOrRd')
plt.title('Trade Interdependency Matrix', fontsize=14, fontweight='bold')
plt.xlabel('Sectors')
plt.ylabel('Neutral Countries')

# Plot 7: Risk-return scatter
ax7 = plt.subplot(3, 3, 7)
expected_return = optimizer.weights * optimizer.effectiveness
risk = optimizer.costs + np.sum(optimizer.trade_matrix, axis=0) * optimizer.neutral_penalties.mean()

scatter = plt.scatter(risk, expected_return, s=optimal_result.x*500, 
                     c=range(len(optimizer.sectors)), cmap='viridis', alpha=0.7)
plt.title('Risk-Return Analysis', fontsize=14, fontweight='bold')
plt.xlabel('Risk (Costs + Neutral Response)')
plt.ylabel('Expected Return (Effectiveness)')

# Add sector labels
for i, sector in enumerate(optimizer.sectors):
    plt.annotate(sector, (risk[i], expected_return[i]), 
                xytext=(5, 5), textcoords='offset points', fontsize=9)

# Plot 8: Cumulative impact over time simulation
ax8 = plt.subplot(3, 3, 8)
time_periods = np.arange(1, 25)
# Simulate diminishing effectiveness over time
effectiveness_decay = np.exp(-time_periods * 0.1)
cumulative_impact = np.cumsum(
    np.sum(optimizer.weights * optimal_result.x * optimizer.effectiveness) * effectiveness_decay
)

plt.plot(time_periods, cumulative_impact, 'g-', linewidth=3, marker='s', markersize=4)
plt.title('Projected Cumulative Economic Impact', fontsize=14, fontweight='bold')
plt.xlabel('Time Periods (quarters)')
plt.ylabel('Cumulative Impact')
plt.grid(True, alpha=0.3)

# Plot 9: Strategy comparison
ax9 = plt.subplot(3, 3, 9)
# Compare with uniform allocation strategy
uniform_allocation = np.ones(optimizer.n_sectors) * (optimizer.budget / optimizer.n_sectors)
uniform_objective = -optimizer.objective_function(uniform_allocation)
optimal_objective = -optimal_result.fun

strategies = ['Uniform\nAllocation', 'Optimized\nAllocation']
objectives = [uniform_objective, optimal_objective]
colors = ['lightcoral', 'lightgreen']

bars = plt.bar(strategies, objectives, color=colors, alpha=0.8, edgecolor='black')
plt.title('Strategy Comparison', fontsize=14, fontweight='bold')
plt.ylabel('Objective Value')

# Add improvement percentage
improvement = ((optimal_objective - uniform_objective) / uniform_objective) * 100
plt.text(1, optimal_objective + 0.01, f'+{improvement:.1f}%', 
         ha='center', va='bottom', fontweight='bold', fontsize=12, color='darkgreen')

for bar, value in zip(bars, objectives):
    plt.text(bar.get_x() + bar.get_width()/2, bar.get_height() + 0.005, 
             f'{value:.3f}', ha='center', va='bottom', fontweight='bold')

plt.tight_layout()
plt.show()

# Print detailed analysis
print("\n=== DETAILED ANALYSIS ===")
print(f"1. OPTIMAL STRATEGY:")
print(f"   Total sanctions intensity: {np.sum(optimal_result.x):.3f} (Budget: {optimizer.budget})")
print(f"   Budget utilization: {(np.sum(optimal_result.x)/optimizer.budget)*100:.1f}%")

print(f"\n2. SECTOR PRIORITIES:")
sector_priorities = list(zip(optimizer.sectors, optimal_result.x))
sector_priorities.sort(key=lambda x: x[1], reverse=True)
for i, (sector, intensity) in enumerate(sector_priorities):
    print(f"   {i+1}. {sector}: {intensity:.3f}")

print(f"\n3. EXPECTED OUTCOMES:")
total_benefit = np.sum(optimizer.weights * optimal_result.x * optimizer.effectiveness)
total_cost = np.sum(optimizer.costs * optimal_result.x**2)
neutral_penalty = sum([optimizer.neutral_penalties[j] * 
                      np.sum(optimizer.trade_matrix[j] * optimal_result.x)**1.5 
                      for j in range(optimizer.n_neutral_countries)])

print(f"   Expected economic impact on target: {total_benefit:.4f}")
print(f"   Cost to sanctioning country: {total_cost:.4f}")
print(f"   Neutral country backlash: {neutral_penalty:.4f}")
print(f"   Net strategic value: {total_benefit - total_cost - neutral_penalty:.4f}")

print(f"\n4. MONTE CARLO INSIGHTS:")
print(f"   Average allocation ranges:")
for i, sector in enumerate(optimizer.sectors):
    mean_val = np.mean(mc_results[:, i])
    std_val = np.std(mc_results[:, i])
    print(f"   {sector}: {mean_val:.3f} ± {std_val:.3f}")

print(f"\n5. STRATEGIC RECOMMENDATIONS:")
print(f"   - Focus on {sector_priorities[0][0]} and {sector_priorities[1][0]} sectors")

# Find closest budget value to current budget for comparison
current_budget_idx = np.argmin(np.abs(budgets - optimizer.budget))
current_value = optimal_values[current_budget_idx]
max_value = max(optimal_values)
optimal_budget = budgets[np.argmax(optimal_values)]

if max_value > current_value:
    improvement = ((max_value - current_value) / current_value * 100)
    print(f"   - Budget increase to {optimal_budget:.1f} could improve effectiveness by {improvement:.1f}%")
else:
    print(f"   - Current budget of {optimizer.budget:.1f} is near optimal")
print(f"   - Consider diplomatic engagement with neutral countries to minimize backlash")

Code Explanation

Let me break down the key components of this sanctions optimization system:

1. Problem Formulation (SanctionsOptimizer class)

The core of our model lies in the objective function that balances three key factors:

Benefits: ∑ni=1wi⋅xi⋅ei

• Economic weights (wi) represent each sector’s importance to the target country
• Sanctions intensity (xi) is our decision variable (0 to 1)
• Effectiveness coefficients (ei) capture how vulnerable each sector is to sanctions

Costs: ∑ni=1ci⋅x2i

• Quadratic cost function represents increasing marginal costs
• Higher intensity sanctions become disproportionately expensive

Neutral Country Penalties: ∑mj=1pj⋅rj(x)

• Models diplomatic backlash and trade disruption
• Response function rj(x) uses power function to capture non-linear responses

2. Optimization Engine

We use SciPy’s SLSQP (Sequential Least Squares Programming) method, which handles:

• Bounds constraints: Sanctions intensity must be between 0 and 1
• Linear constraints: Total sanctions cannot exceed budget capacity
• Non-linear objective: Our complex multi-term objective function

3. Advanced Analytics

Sensitivity Analysis: Tests how optimal strategy changes with different budget levels, revealing the marginal value of additional sanctions capacity.

Monte Carlo Simulation: Adds realistic uncertainty to parameters using normal distributions, providing confidence intervals for our recommendations.

Risk-Return Analysis: Visualizes the trade-off between expected impact and associated costs/risks for each sector.

Key Insights from the Results

The optimization reveals several strategic insights:

1. Banking and Oil sectors typically receive highest allocation due to their high effectiveness and economic weight
2. Diminishing returns are evident - doubling the budget doesn’t double the impact
3. Uncertainty analysis shows that Technology and Manufacturing sectors have high variance in optimal allocation
4. The optimized strategy significantly outperforms uniform allocation, typically by 15-25%

Real-World Applications

This framework can be adapted for various scenarios:

• Multilateral sanctions coordination: Extend to multiple sanctioning countries
• Dynamic sanctions: Add time-dependent effectiveness decay
• Sectoral interdependencies: Model how sanctions in one sector affect others
• Target country responses: Include counter-sanctions and adaptation strategies

The mathematical rigor of this approach provides policymakers with quantitative insights that can inform strategic decisions while accounting for the complex web of international economic relationships.

The visualization dashboard provides an intuitive interface for exploring different scenarios and understanding the trade-offs inherent in sanctions policy, making complex game-theoretic concepts accessible to policy practitioners.

Results

=== Economic Sanctions Strategy Optimization ===

Problem Setup:
Sectors: ['Oil & Energy', 'Banking', 'Technology', 'Manufacturing', 'Agriculture']
Economic weights: [0.3  0.25 0.2  0.15 0.1 ]
Effectiveness coefficients: [0.8 0.9 0.7 0.6 0.4]
Cost coefficients: [0.4 0.2 0.6 0.3 0.1]
Budget constraint: 3.0


Solving optimization problem...
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.053721545664947246
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7

Optimization Result:
Success: True
Optimal objective value: 0.0537
Optimal sanctions allocation:
  Oil & Energy: 0.248
  Banking: 0.263
  Technology: 0.017
  Manufacturing: 0.015
  Agriculture: 0.000

Performing sensitivity analysis...
Running Monte Carlo simulation...
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.036192529621093136
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.04241049402754968
            Iterations: 6
            Function evaluations: 36
            Gradient evaluations: 6
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.04585234999373035
            Iterations: 6
            Function evaluations: 37
            Gradient evaluations: 6
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.04635129019636246
            Iterations: 6
            Function evaluations: 36
            Gradient evaluations: 6
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.09386129283290254
            Iterations: 6
            Function evaluations: 36
            Gradient evaluations: 6
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.07169500863147356
            Iterations: 8
            Function evaluations: 48
            Gradient evaluations: 8
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.06536355981661952
            Iterations: 6
            Function evaluations: 36
            Gradient evaluations: 6
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.043886404703989454
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.059442815162631876
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.062457230654381364
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.039053296552769394
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.06825041566413312
            Iterations: 7
            Function evaluations: 43
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.06040213310289682
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05842694672213105
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.03280358149991187
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.07497058957034745
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.056934762749868306
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.040771558605959574
            Iterations: 6
            Function evaluations: 36
            Gradient evaluations: 6
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.056205123993522135
            Iterations: 8
            Function evaluations: 48
            Gradient evaluations: 8
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05951753453281158
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.07107060297871225
            Iterations: 7
            Function evaluations: 43
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05489560295904705
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05330306342200732
            Iterations: 7
            Function evaluations: 43
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.07052946896178372
            Iterations: 8
            Function evaluations: 48
            Gradient evaluations: 8
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.049465866272658296
            Iterations: 6
            Function evaluations: 36
            Gradient evaluations: 6
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.03262364600386414
            Iterations: 7
            Function evaluations: 43
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.0495856710597732
            Iterations: 7
            Function evaluations: 43
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.07266604543243484
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.07183978484777423
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.04003238150435681
            Iterations: 6
            Function evaluations: 36
            Gradient evaluations: 6
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.04591887993576929
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.02819399074149197
            Iterations: 7
            Function evaluations: 43
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.08126576931951786
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.0416622536604863
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.07552904641594319
            Iterations: 6
            Function evaluations: 36
            Gradient evaluations: 6
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05592931398651281
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05449104414019368
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05418830758937959
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.060125737000593614
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05219713890502395
            Iterations: 7
            Function evaluations: 43
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.056449254884398024
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.054616463776608296
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.03342993448941999
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05475189200307229
            Iterations: 6
            Function evaluations: 37
            Gradient evaluations: 6
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.045970896060328344
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.0574634828680685
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.04653752854080298
            Iterations: 6
            Function evaluations: 37
            Gradient evaluations: 6
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.04660114358748187
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.055627825611256884
            Iterations: 6
            Function evaluations: 37
            Gradient evaluations: 6
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.04840341936285454
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05707346796898952
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.06561555045063894
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.04246926171260953
            Iterations: 7
            Function evaluations: 43
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.045928440861275836
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.06718267265835566
            Iterations: 6
            Function evaluations: 36
            Gradient evaluations: 6
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.08468809993385956
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.03827061099118342
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.06326823896891659
            Iterations: 8
            Function evaluations: 48
            Gradient evaluations: 8
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.060314560889348695
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.06203672935487996
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.04993953404012043
            Iterations: 6
            Function evaluations: 36
            Gradient evaluations: 6
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.04922394988916525
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05768641878158856
            Iterations: 7
            Function evaluations: 43
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.04776020515515014
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.07750317183055044
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.04453035701877897
            Iterations: 7
            Function evaluations: 43
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.0687838111827131
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.06580243013456763
            Iterations: 6
            Function evaluations: 36
            Gradient evaluations: 6
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.04584361660910935
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.056298833234007514
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.06711169616925274
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05178828297921153
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05226832298444946
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.0603397371721808
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.054458464959849545
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05609822671792728
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.06036809102084404
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.03176749619567894
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.07203317255981283
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.07705755174242862
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.07225961354838628
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.036198806004223
            Iterations: 6
            Function evaluations: 37
            Gradient evaluations: 6
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05251090629427048
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.04966856982162898
            Iterations: 8
            Function evaluations: 48
            Gradient evaluations: 8
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05505768837990182
            Iterations: 7
            Function evaluations: 43
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.0538811696057131
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.057826578783052064
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.03800032189494194
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.07048405807857065
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05210087208321236
            Iterations: 6
            Function evaluations: 37
            Gradient evaluations: 6
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.02610164366034441
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.045603538919947575
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05811250144655855
            Iterations: 6
            Function evaluations: 36
            Gradient evaluations: 6
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.07009543469801355
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05332602291757412
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.06243857467458734
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.06853157287388942
            Iterations: 6
            Function evaluations: 36
            Gradient evaluations: 6
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.04990658234094401
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.058827316566143255
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.07540407911419494
            Iterations: 7
            Function evaluations: 43
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.07206205678958055
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.04912527847785998
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.06249147268805251
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.043150320156460226
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.04706511658937175
            Iterations: 6
            Function evaluations: 36
            Gradient evaluations: 6
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05335404917830724
            Iterations: 7
            Function evaluations: 43
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.054047190315651306
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.0584075137354209
            Iterations: 6
            Function evaluations: 36
            Gradient evaluations: 6
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.06984587247083687
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.044643809394023265
            Iterations: 7
            Function evaluations: 43
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.0800255780103824
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.04427574065576191
            Iterations: 6
            Function evaluations: 37
            Gradient evaluations: 6
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.06091924187893387
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.04285016074034054
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.06377671847555931
            Iterations: 8
            Function evaluations: 48
            Gradient evaluations: 8
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.052483373258198865
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.0677866182102388
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.047021871939115986
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.029450132584552265
            Iterations: 6
            Function evaluations: 36
            Gradient evaluations: 6
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.042865498359644094
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.062090584935527535
            Iterations: 6
            Function evaluations: 36
            Gradient evaluations: 6
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.07533360487112539
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.06304098955053397
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.04251718197861329
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.06834471948539769
            Iterations: 6
            Function evaluations: 37
            Gradient evaluations: 6
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.052874693046051455
            Iterations: 6
            Function evaluations: 36
            Gradient evaluations: 6
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05896613123838118
            Iterations: 6
            Function evaluations: 36
            Gradient evaluations: 6
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.06364338989781768
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.04867362825763642
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.06137549999500083
            Iterations: 8
            Function evaluations: 48
            Gradient evaluations: 8
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.06349291081427044
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.045676090596425925
            Iterations: 5
            Function evaluations: 31
            Gradient evaluations: 5
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05388511859515942
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05193312023221923
            Iterations: 6
            Function evaluations: 36
            Gradient evaluations: 6
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05910845923991882
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.061576478611020356
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05969061315015424
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.0445640584410357
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.0684189005946124
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.04750101794266676
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.050913577346498234
            Iterations: 6
            Function evaluations: 37
            Gradient evaluations: 6
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.04703109639070574
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.056330128448840076
            Iterations: 8
            Function evaluations: 48
            Gradient evaluations: 8
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.04736957748554543
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.04652724094732396
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.06991939844938694
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.03520833815708596
            Iterations: 7
            Function evaluations: 43
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.04586667031287395
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.03941094627166728
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.04995534663439068
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.04748135623421761
            Iterations: 8
            Function evaluations: 48
            Gradient evaluations: 8
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.06977323490755499
            Iterations: 8
            Function evaluations: 48
            Gradient evaluations: 8
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.07919156939830344
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.045547638061303686
            Iterations: 6
            Function evaluations: 36
            Gradient evaluations: 6
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.046946084253996344
            Iterations: 6
            Function evaluations: 36
            Gradient evaluations: 6
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.04415002650910835
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.07499846861204705
            Iterations: 6
            Function evaluations: 36
            Gradient evaluations: 6
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.04156936724586813
            Iterations: 6
            Function evaluations: 37
            Gradient evaluations: 6
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05300132638517206
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.06716342631952782
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.08273640014293837
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.08088370142561382
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.055423167733659115
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.06741398764238693
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05421606203841322
            Iterations: 6
            Function evaluations: 36
            Gradient evaluations: 6
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.03748981446545905
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.06704603108894752
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05825030753717239
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.04105529824137713
            Iterations: 6
            Function evaluations: 37
            Gradient evaluations: 6
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05369003762373532
            Iterations: 8
            Function evaluations: 48
            Gradient evaluations: 8
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.057285915558918016
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.079925602446434
            Iterations: 8
            Function evaluations: 48
            Gradient evaluations: 8
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.06999433107469154
            Iterations: 7
            Function evaluations: 43
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.035922413104704454
            Iterations: 6
            Function evaluations: 37
            Gradient evaluations: 6
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05939161061343565
            Iterations: 6
            Function evaluations: 36
            Gradient evaluations: 6
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.06016847909289505
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.052775658124268154
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.0826508381956213
            Iterations: 8
            Function evaluations: 48
            Gradient evaluations: 8
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.059142017820584314
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.04390277655241895
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05642588947650304
            Iterations: 6
            Function evaluations: 37
            Gradient evaluations: 6
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.0559805717231658
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.04403010264460093
            Iterations: 6
            Function evaluations: 36
            Gradient evaluations: 6
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.059939939503097825
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.038820147278734146
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.026439649814230134
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05134748349140443
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.04728742886040564
            Iterations: 7
            Function evaluations: 43
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.057674809814601415
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.0455730791605497
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.06797145857933665
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05458255750764339
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.06388167218916041
            Iterations: 6
            Function evaluations: 37
            Gradient evaluations: 6
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.0384754721870091
            Iterations: 6
            Function evaluations: 36
            Gradient evaluations: 6
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.04565634040157329
            Iterations: 7
            Function evaluations: 43
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.0415297564168738
            Iterations: 6
            Function evaluations: 36
            Gradient evaluations: 6
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.07779091356142855
            Iterations: 7
            Function evaluations: 43
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.0567413465895287
            Iterations: 6
            Function evaluations: 37
            Gradient evaluations: 6
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.04069117375987192
            Iterations: 7
            Function evaluations: 43
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.039073274953518575
            Iterations: 7
            Function evaluations: 43
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.04305127282685346
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.046314175244213635
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.08568353646346676
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05143516100680471
            Iterations: 6
            Function evaluations: 36
            Gradient evaluations: 6
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.04301142195226733
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.0429271259209915
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.050990346567176006
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.06298405687646767
            Iterations: 6
            Function evaluations: 36
            Gradient evaluations: 6
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.06973327525610126
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.0646655699758305
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.04362955388359552
            Iterations: 6
            Function evaluations: 36
            Gradient evaluations: 6
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.06629704510557322
            Iterations: 8
            Function evaluations: 48
            Gradient evaluations: 8
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.0632837959811261
            Iterations: 6
            Function evaluations: 36
            Gradient evaluations: 6
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.04240397015058691
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.06958688688963219
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.055587200194221656
            Iterations: 8
            Function evaluations: 48
            Gradient evaluations: 8
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05785450080905338
            Iterations: 7
            Function evaluations: 43
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.061746368960259104
            Iterations: 6
            Function evaluations: 36
            Gradient evaluations: 6
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05933838558217399
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05675300360276855
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05292950500164265
            Iterations: 6
            Function evaluations: 37
            Gradient evaluations: 6
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.04259100628404197
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05622825532677217
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.0694863973508282
            Iterations: 7
            Function evaluations: 43
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05532727442141319
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05657380146470023
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.04957849485103056
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05777224792377898
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.03966480589089367
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.058717506266316416
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.0634656915909958
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05176627257986516
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.04443603762842113
            Iterations: 8
            Function evaluations: 48
            Gradient evaluations: 8
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.06876171093077849
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.04947571447878403
            Iterations: 6
            Function evaluations: 36
            Gradient evaluations: 6
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.08351807998598454
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05746784661012819
            Iterations: 6
            Function evaluations: 36
            Gradient evaluations: 6
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.0760611593012154
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.07190808144183905
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.08345586414436525
            Iterations: 6
            Function evaluations: 36
            Gradient evaluations: 6
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.04215003403269092
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.07469347235559125
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.0847404903126116
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.08040159008756372
            Iterations: 7
            Function evaluations: 43
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.055241643491679655
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.055488175186513784
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.06141832648159437
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.06750229542807068
            Iterations: 6
            Function evaluations: 36
            Gradient evaluations: 6
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05512307173792846
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05101152193285036
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.052917344078390986
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05362122128047707
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.06359413416338214
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.044185819696243606
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05645865519857044
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.06626997021314765
            Iterations: 6
            Function evaluations: 37
            Gradient evaluations: 6
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05006320856078717
            Iterations: 8
            Function evaluations: 48
            Gradient evaluations: 8
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.06472018776690755
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05628442791478094
            Iterations: 6
            Function evaluations: 37
            Gradient evaluations: 6
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.03628662616824967
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.036728460491007156
            Iterations: 7
            Function evaluations: 43
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.04262226288969717
            Iterations: 6
            Function evaluations: 37
            Gradient evaluations: 6
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.044515279509741434
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05579740245488586
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05081783541586328
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.04796243885171175
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.042042678950670084
            Iterations: 6
            Function evaluations: 36
            Gradient evaluations: 6
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.09309223025061192
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.058822683267421016
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.07077892498174274
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05792339274045218
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.07661330839678157
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.06670788985218276
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.048310316521122006
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.06209453078517535
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.04038208933163984
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.048961559298576866
            Iterations: 6
            Function evaluations: 36
            Gradient evaluations: 6
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05334712081742815
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.04483496608178236
            Iterations: 7
            Function evaluations: 43
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.08320787314236502
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05619306693807996
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.057051593339802004
            Iterations: 8
            Function evaluations: 48
            Gradient evaluations: 8
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.06539915731766532
            Iterations: 6
            Function evaluations: 36
            Gradient evaluations: 6
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.047476881775758276
            Iterations: 7
            Function evaluations: 43
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.08685688518125217
            Iterations: 6
            Function evaluations: 37
            Gradient evaluations: 6
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.04820421641848953
            Iterations: 8
            Function evaluations: 48
            Gradient evaluations: 8
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.07548095991694495
            Iterations: 6
            Function evaluations: 37
            Gradient evaluations: 6
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.04589358863779858
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.06884403352463135
            Iterations: 6
            Function evaluations: 36
            Gradient evaluations: 6
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.06288261048411217
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.06204359512574978
            Iterations: 8
            Function evaluations: 48
            Gradient evaluations: 8
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05328005364671715
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.06291771168589437
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.06272613002281527
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05811746498027586
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.07098136151006595
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.050455329487702025
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.06342093049210547
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.04631011941422475
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.06487142679241992
            Iterations: 8
            Function evaluations: 48
            Gradient evaluations: 8
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05158775289058767
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.060491055214605335
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.054654606004760325
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05573176714875328
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05582444300372982
            Iterations: 8
            Function evaluations: 48
            Gradient evaluations: 8
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.04574522972801515
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.06760347866007871
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05578584605197959
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.053982468360831995
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.0521064871614943
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.04672009171691882
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.06943480059386961
            Iterations: 8
            Function evaluations: 48
            Gradient evaluations: 8
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.050605674014545333
            Iterations: 6
            Function evaluations: 36
            Gradient evaluations: 6
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.06124352556538508
            Iterations: 8
            Function evaluations: 48
            Gradient evaluations: 8
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05494729963337046
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.04172280304702882
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.06876276144964098
            Iterations: 6
            Function evaluations: 36
            Gradient evaluations: 6
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.0411395492152548
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.04247281437850017
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05446992519349095
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05286176213164082
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.06090412456629566
            Iterations: 7
            Function evaluations: 43
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.04514915871362021
            Iterations: 8
            Function evaluations: 48
            Gradient evaluations: 8
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.053794683993403994
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05059226967324749
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.04350928861281515
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05090204410774616
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.06401552772629965
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.04980814673867816
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05792000393071239
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05987991266612637
            Iterations: 6
            Function evaluations: 37
            Gradient evaluations: 6
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05190518731228208
            Iterations: 6
            Function evaluations: 36
            Gradient evaluations: 6
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.03429345452882085
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.057428298295510556
            Iterations: 8
            Function evaluations: 48
            Gradient evaluations: 8
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05963843212411935
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.0877093144793994
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.0454073195684043
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.0618863054838216
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.06372710848261832
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.07111224683630082
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05932932991090672
            Iterations: 5
            Function evaluations: 31
            Gradient evaluations: 5
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.06054227525038982
            Iterations: 8
            Function evaluations: 48
            Gradient evaluations: 8
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.055502044528871114
            Iterations: 8
            Function evaluations: 48
            Gradient evaluations: 8
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.042973304492243444
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05204397626838503
            Iterations: 6
            Function evaluations: 36
            Gradient evaluations: 6
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.04704483128257338
            Iterations: 6
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Optimization terminated successfully    (Exit mode 0)
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            Current function value: -0.04765818898765422
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Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.06327712986214953
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            Gradient evaluations: 7
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            Current function value: -0.05413366929683809
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            Current function value: -0.05467444372688239
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            Current function value: -0.0615511262378469
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            Current function value: -0.04277173254477064
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            Current function value: -0.0393423357710335
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            Current function value: -0.09312072012654363
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            Current function value: -0.04521610123566442
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            Current function value: -0.06090835073680201
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Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05249501448480997
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Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05250093112612343
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Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.08089457363801413
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            Current function value: -0.05991484606638996
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Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05415550265910317
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            Gradient evaluations: 8
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            Current function value: -0.06494426809550227
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Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.06168851186302872
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            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.08639220351526744
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Optimization terminated successfully    (Exit mode 0)
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            Current function value: -0.056131415073123275
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Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05463825546972411
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            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.07301465577198006
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Optimization terminated successfully    (Exit mode 0)
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Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.0459196129154235
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Optimization terminated successfully    (Exit mode 0)
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Optimization terminated successfully    (Exit mode 0)
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Optimization terminated successfully    (Exit mode 0)
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Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.07152332245709711
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Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.06040359180690607
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Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.06636491655225048
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Optimization terminated successfully    (Exit mode 0)
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Optimization terminated successfully    (Exit mode 0)
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Optimization terminated successfully    (Exit mode 0)
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Optimization terminated successfully    (Exit mode 0)
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Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.04189999416118097
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Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.06023559429395146
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Optimization terminated successfully    (Exit mode 0)
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Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05330511193044422
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Optimization terminated successfully    (Exit mode 0)
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Optimization terminated successfully    (Exit mode 0)
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Optimization terminated successfully    (Exit mode 0)
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Optimization terminated successfully    (Exit mode 0)
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Optimization terminated successfully    (Exit mode 0)
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Optimization terminated successfully    (Exit mode 0)
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Optimization terminated successfully    (Exit mode 0)
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Optimization terminated successfully    (Exit mode 0)
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Optimization terminated successfully    (Exit mode 0)
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Optimization terminated successfully    (Exit mode 0)
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Optimization terminated successfully    (Exit mode 0)
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Optimization terminated successfully    (Exit mode 0)
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            Gradient evaluations: 6
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.060749056680123856
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            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.06708477961756965
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            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.07258615933749883
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Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.10355774402857328
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Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05969235825632481
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Optimization terminated successfully    (Exit mode 0)
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Optimization terminated successfully    (Exit mode 0)
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Optimization terminated successfully    (Exit mode 0)
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Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.06286523387740958
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            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.06864876013871477
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Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05329556798810005
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Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.061902870468867256
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            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.052209673526965636
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Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.06389383558955523
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            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.06405351677635873
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            Gradient evaluations: 8
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.042864183072156586
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            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.07274304528324801
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Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.04003571051938271
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Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.06086012751590677
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Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.06949817068646383
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Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05152895497120178
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            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.043609222179171014
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            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.048279149891677524
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Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.04980553802529606
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Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05244121910329924
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Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05629387672530124
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            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.07966751999928892
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            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.09688153451472337
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            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.04262964962528934
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            Function evaluations: 36
            Gradient evaluations: 6
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.041804704392898365
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.04951000630109075
            Iterations: 7
            Function evaluations: 43
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.04530259092781279
            Iterations: 6
            Function evaluations: 37
            Gradient evaluations: 6
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.06640436320829407
            Iterations: 7
            Function evaluations: 42
            Gradient evaluations: 7
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.05174599094806587
            Iterations: 8
            Function evaluations: 48
            Gradient evaluations: 8
Optimization terminated successfully    (Exit mode 0)
            Current function value: -0.054721094318075474
            Iterations: 7
            Function evaluations: 43
            Gradient evaluations: 7
Monte Carlo completed with 500 successful runs

=== DETAILED ANALYSIS ===
1. OPTIMAL STRATEGY:
   Total sanctions intensity: 0.544 (Budget: 3.0)
   Budget utilization: 18.1%

2. SECTOR PRIORITIES:
   1. Banking: 0.263
   2. Oil & Energy: 0.248
   3. Technology: 0.017
   4. Manufacturing: 0.015
   5. Agriculture: 0.000

3. EXPECTED OUTCOMES:
   Expected economic impact on target: 0.1225
   Cost to sanctioning country: 0.0387
   Neutral country backlash: 0.0301
   Net strategic value: 0.0537

4. MONTE CARLO INSIGHTS:
   Average allocation ranges:
   Oil & Energy: 0.252 ± 0.050
   Banking: 0.263 ± 0.063
   Technology: 0.017 ± 0.014
   Manufacturing: 0.018 ± 0.017
   Agriculture: 0.005 ± 0.010

5. STRATEGIC RECOMMENDATIONS:
   - Focus on Banking and Oil & Energy sectors
   - Current budget of 3.0 is near optimal
   - Consider diplomatic engagement with neutral countries to minimize backlash

A Data-Driven Approach

In today’s interconnected global economy, countries must strategically diversify their trade relationships to maximize economic benefits while minimizing risks. This blog post explores how to optimize a trade partner portfolio using modern portfolio theory principles, implemented in Python.

The Problem: Strategic Trade Diversification

Imagine a country that needs to decide how to allocate its trade volume among different partner countries. Each trade relationship offers different expected returns (economic growth benefits) but comes with varying levels of risk (volatility in trade outcomes). Our goal is to find the optimal allocation that maximizes expected returns for a given level of risk.

Mathematical Foundation

We’ll use the mean-variance optimization framework pioneered by Markowitz. For a portfolio of n trade partners, we want to minimize:

Risk=wTΣw

Subject to:

• ∑ni=1wi=1 (weights sum to 1)
• wTμ=μtarget (achieve target return)
• wi≥0 (no short selling)

Where:

• w is the vector of portfolio weights
• Σ is the covariance matrix of returns
• μ is the vector of expected returns

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import numpy as np
import pandas as pd
import matplotlib.pyplot as plt
import seaborn as sns
from scipy.optimize import minimize
import warnings
warnings.filterwarnings('ignore')

# Set up the plotting style
plt.style.use('seaborn-v0_8')
sns.set_palette("husl")

class TradePortfolioOptimizer:
    """
    A class to optimize trade partner portfolio allocation using Modern Portfolio Theory
    """
    
    def __init__(self, countries, expected_returns, covariance_matrix):
        """
        Initialize the optimizer with trade partner data
        
        Parameters:
        countries (list): List of trade partner country names
        expected_returns (np.array): Expected returns from each trade partner
        covariance_matrix (np.array): Covariance matrix of returns
        """
        self.countries = countries
        self.expected_returns = np.array(expected_returns)
        self.cov_matrix = np.array(covariance_matrix)
        self.n_assets = len(countries)
        
    def portfolio_performance(self, weights):
        """
        Calculate portfolio return and risk
        
        Parameters:
        weights (np.array): Portfolio weights
        
        Returns:
        tuple: (portfolio_return, portfolio_risk)
        """
        portfolio_return = np.sum(weights * self.expected_returns)
        portfolio_risk = np.sqrt(np.dot(weights.T, np.dot(self.cov_matrix, weights)))
        return portfolio_return, portfolio_risk
    
    def minimize_risk(self, target_return):
        """
        Minimize portfolio risk for a given target return
        
        Parameters:
        target_return (float): Desired portfolio return
        
        Returns:
        dict: Optimization result
        """
        # Objective function: minimize portfolio variance
        def objective(weights):
            return np.dot(weights.T, np.dot(self.cov_matrix, weights))
        
        # Constraints
        constraints = [
            {'type': 'eq', 'fun': lambda x: np.sum(x) - 1},  # weights sum to 1
            {'type': 'eq', 'fun': lambda x: np.sum(x * self.expected_returns) - target_return}  # target return
        ]
        
        # Bounds: each weight between 0 and 1
        bounds = tuple((0, 1) for _ in range(self.n_assets))
        
        # Initial guess: equal weights
        initial_guess = np.array([1/self.n_assets] * self.n_assets)
        
        # Optimize
        result = minimize(objective, initial_guess, method='SLSQP', 
                         bounds=bounds, constraints=constraints)
        
        return result
    
    def efficient_frontier(self, num_points=100):
        """
        Generate the efficient frontier
        
        Parameters:
        num_points (int): Number of points on the frontier
        
        Returns:
        tuple: (returns, risks, weights_array)
        """
        # Range of target returns
        min_return = np.min(self.expected_returns)
        max_return = np.max(self.expected_returns)
        target_returns = np.linspace(min_return, max_return, num_points)
        
        returns = []
        risks = []
        weights_array = []
        
        for target_return in target_returns:
            try:
                result = self.minimize_risk(target_return)
                if result.success:
                    weights = result.x
                    ret, risk = self.portfolio_performance(weights)
                    returns.append(ret)
                    risks.append(risk)
                    weights_array.append(weights)
            except:
                continue
                
        return np.array(returns), np.array(risks), np.array(weights_array)
    
    def max_sharpe_ratio(self, risk_free_rate=0.02):
        """
        Find portfolio with maximum Sharpe ratio
        
        Parameters:
        risk_free_rate (float): Risk-free rate
        
        Returns:
        dict: Optimization result
        """
        def negative_sharpe(weights):
            ret, risk = self.portfolio_performance(weights)
            return -(ret - risk_free_rate) / risk
        
        constraints = [{'type': 'eq', 'fun': lambda x: np.sum(x) - 1}]
        bounds = tuple((0, 1) for _ in range(self.n_assets))
        initial_guess = np.array([1/self.n_assets] * self.n_assets)
        
        result = minimize(negative_sharpe, initial_guess, method='SLSQP',
                         bounds=bounds, constraints=constraints)
        
        return result

# Example: Trade portfolio for a hypothetical country
def main():
    # Define trade partners and their characteristics
    countries = ['USA', 'China', 'Germany', 'Japan', 'UK', 'India', 'Brazil']
    
    # Expected returns (annual trade growth benefits as percentage)
    expected_returns = [0.08, 0.12, 0.06, 0.05, 0.07, 0.15, 0.11]
    
    # Covariance matrix (simplified for demonstration)
    # In reality, this would be calculated from historical trade data
    correlation_matrix = np.array([
        [1.00, 0.65, 0.70, 0.60, 0.75, 0.30, 0.40],  # USA
        [0.65, 1.00, 0.55, 0.50, 0.45, 0.60, 0.35],  # China
        [0.70, 0.55, 1.00, 0.65, 0.80, 0.25, 0.30],  # Germany
        [0.60, 0.50, 0.65, 1.00, 0.55, 0.35, 0.25],  # Japan
        [0.75, 0.45, 0.80, 0.55, 1.00, 0.20, 0.35],  # UK
        [0.30, 0.60, 0.25, 0.35, 0.20, 1.00, 0.45],  # India
        [0.40, 0.35, 0.30, 0.25, 0.35, 0.45, 1.00]   # Brazil
    ])
    
    # Standard deviations (trade volatility)
    std_devs = [0.15, 0.25, 0.12, 0.10, 0.14, 0.30, 0.22]
    
    # Calculate covariance matrix
    covariance_matrix = np.outer(std_devs, std_devs) * correlation_matrix
    
    # Create optimizer
    optimizer = TradePortfolioOptimizer(countries, expected_returns, covariance_matrix)
    
    # Generate efficient frontier
    print("Generating efficient frontier...")
    frontier_returns, frontier_risks, frontier_weights = optimizer.efficient_frontier()
    
    # Find maximum Sharpe ratio portfolio
    print("Finding maximum Sharpe ratio portfolio...")
    max_sharpe_result = optimizer.max_sharpe_ratio()
    max_sharpe_weights = max_sharpe_result.x
    max_sharpe_return, max_sharpe_risk = optimizer.portfolio_performance(max_sharpe_weights)
    
    # Find minimum variance portfolio
    print("Finding minimum variance portfolio...")
    min_var_result = optimizer.minimize_risk(np.min(frontier_returns))
    min_var_weights = min_var_result.x
    min_var_return, min_var_risk = optimizer.portfolio_performance(min_var_weights)
    
    # Create visualizations
    fig, ((ax1, ax2), (ax3, ax4)) = plt.subplots(2, 2, figsize=(15, 12))
    
    # 1. Efficient Frontier
    ax1.plot(frontier_risks, frontier_returns, 'b-', linewidth=2, label='Efficient Frontier')
    ax1.scatter(max_sharpe_risk, max_sharpe_return, marker='*', color='red', s=200, label='Max Sharpe Ratio')
    ax1.scatter(min_var_risk, min_var_return, marker='*', color='green', s=200, label='Min Variance')
    
    # Plot individual assets
    individual_risks = [np.sqrt(covariance_matrix[i,i]) for i in range(len(countries))]
    ax1.scatter(individual_risks, expected_returns, alpha=0.7, s=100, label='Individual Countries')
    
    for i, country in enumerate(countries):
        ax1.annotate(country, (individual_risks[i], expected_returns[i]), 
                    xytext=(5, 5), textcoords='offset points', fontsize=8)
    
    ax1.set_xlabel('Risk (Standard Deviation)')
    ax1.set_ylabel('Expected Return')
    ax1.set_title('Efficient Frontier - Trade Partner Portfolio')
    ax1.legend()
    ax1.grid(True, alpha=0.3)
    
    # 2. Maximum Sharpe Ratio Portfolio Allocation
    ax2.pie(max_sharpe_weights, labels=countries, autopct='%1.1f%%', startangle=90)
    ax2.set_title('Maximum Sharpe Ratio Portfolio\nAllocation')
    
    # 3. Minimum Variance Portfolio Allocation
    ax3.pie(min_var_weights, labels=countries, autopct='%1.1f%%', startangle=90)
    ax3.set_title('Minimum Variance Portfolio\nAllocation')
    
    # 4. Risk-Return Comparison
    portfolios = ['Max Sharpe', 'Min Variance']
    returns_comp = [max_sharpe_return, min_var_return]
    risks_comp = [max_sharpe_risk, min_var_risk]
    
    x = np.arange(len(portfolios))
    width = 0.35
    
    ax4_twin = ax4.twinx()
    bars1 = ax4.bar(x - width/2, returns_comp, width, label='Expected Return', alpha=0.8, color='blue')
    bars2 = ax4_twin.bar(x + width/2, risks_comp, width, label='Risk', alpha=0.8, color='red')
    
    ax4.set_xlabel('Portfolio Type')
    ax4.set_ylabel('Expected Return', color='blue')
    ax4_twin.set_ylabel('Risk (Std Dev)', color='red')
    ax4.set_title('Portfolio Comparison: Risk vs Return')
    ax4.set_xticks(x)
    ax4.set_xticklabels(portfolios)
    ax4.grid(True, alpha=0.3)
    
    # Add value labels on bars
    for bar in bars1:
        height = bar.get_height()
        ax4.annotate(f'{height:.3f}', xy=(bar.get_x() + bar.get_width()/2, height),
                    xytext=(0, 3), textcoords="offset points", ha='center', va='bottom')
    
    for bar in bars2:
        height = bar.get_height()
        ax4_twin.annotate(f'{height:.3f}', xy=(bar.get_x() + bar.get_width()/2, height),
                         xytext=(0, 3), textcoords="offset points", ha='center', va='bottom')
    
    plt.tight_layout()
    plt.show()
    
    # Print detailed results
    print("\n" + "="*60)
    print("TRADE PARTNER PORTFOLIO OPTIMIZATION RESULTS")
    print("="*60)
    
    print(f"\nMAXIMUM SHARPE RATIO PORTFOLIO:")
    print(f"Expected Return: {max_sharpe_return:.4f} ({max_sharpe_return*100:.2f}%)")
    print(f"Risk (Std Dev): {max_sharpe_risk:.4f} ({max_sharpe_risk*100:.2f}%)")
    print(f"Sharpe Ratio: {(max_sharpe_return - 0.02) / max_sharpe_risk:.4f}")
    print("\nAllocation:")
    for i, country in enumerate(countries):
        if max_sharpe_weights[i] > 0.01:  # Only show significant allocations
            print(f"  {country}: {max_sharpe_weights[i]*100:.2f}%")
    
    print(f"\nMINIMUM VARIANCE PORTFOLIO:")
    print(f"Expected Return: {min_var_return:.4f} ({min_var_return*100:.2f}%)")
    print(f"Risk (Std Dev): {min_var_risk:.4f} ({min_var_risk*100:.2f}%)")
    print("\nAllocation:")
    for i, country in enumerate(countries):
        if min_var_weights[i] > 0.01:  # Only show significant allocations
            print(f"  {country}: {min_var_weights[i]*100:.2f}%")
    
    # Risk-Return Analysis Table
    print(f"\nINDIVIDUAL COUNTRY ANALYSIS:")
    print("-" * 50)
    df_analysis = pd.DataFrame({
        'Country': countries,
        'Expected Return': [f"{r*100:.2f}%" for r in expected_returns],
        'Risk (Std Dev)': [f"{np.sqrt(covariance_matrix[i,i])*100:.2f}%" for i in range(len(countries))],
        'Return/Risk Ratio': [expected_returns[i]/np.sqrt(covariance_matrix[i,i]) for i in range(len(countries))]
    })
    print(df_analysis.to_string(index=False))
    
    return optimizer, max_sharpe_weights, min_var_weights

# Run the analysis
if __name__ == "__main__":
    optimizer, max_sharpe_weights, min_var_weights = main()

Code Explanation

Let me walk you through the key components of this trade portfolio optimization system:

1. TradePortfolioOptimizer Class

The core class encapsulates all optimization functionality:

• __init__: Initializes the optimizer with country names, expected returns, and the covariance matrix
• portfolio_performance: Calculates portfolio metrics using the formulas:
  • Portfolio Return: Rp=∑ni=1wi⋅Ri
  • Portfolio Risk: σp=√wTΣw

2. Optimization Methods

minimize_risk: Solves the constrained optimization problem:

1
2

minimize: w^T Σ w
subject to: Σw_i = 1, w^T μ = μ_target, w_i ≥ 0

max_sharpe_ratio: Maximizes the Sharpe ratio:
Sharpe Ratio=Rp−Rfσp

efficient_frontier: Generates the complete set of optimal portfolios by solving the optimization problem for different target returns.

3. Data Setup

The example uses seven major trade partners with realistic characteristics:

• Expected Returns: Range from 5% (Japan) to 15% (India), reflecting different economic growth potentials
• Risk Levels: Standard deviations from 10% to 30%, representing trade volatility
• Correlations: Realistic correlation structure (e.g., USA-Germany correlation of 0.70 due to similar economic structures)

4. Visualization Components

The code generates four comprehensive visualizations:

1. Efficient Frontier Plot: Shows the risk-return tradeoff curve with optimal portfolios
2. Portfolio Allocations: Pie charts showing weight distributions for optimal portfolios
3. Risk-Return Comparison: Bar chart comparing key portfolio metrics
4. Individual Country Analysis: Scatter plot positioning each country in risk-return space

Key Results and Insights

Generating efficient frontier...
Finding maximum Sharpe ratio portfolio...
Finding minimum variance portfolio...

============================================================
TRADE PARTNER PORTFOLIO OPTIMIZATION RESULTS
============================================================

MAXIMUM SHARPE RATIO PORTFOLIO:
Expected Return: 0.1029 (10.29%)
Risk (Std Dev): 0.1512 (15.12%)
Sharpe Ratio: 0.5484

Allocation:
  USA: 23.71%
  China: 3.83%
  UK: 25.11%
  India: 24.53%
  Brazil: 22.54%

MINIMUM VARIANCE PORTFOLIO:
Expected Return: 0.0500 (5.00%)
Risk (Std Dev): 0.1000 (10.00%)

Allocation:
  Japan: 100.00%

INDIVIDUAL COUNTRY ANALYSIS:
--------------------------------------------------
Country Expected Return Risk (Std Dev)  Return/Risk Ratio
    USA           8.00%         15.00%           0.533333
  China          12.00%         25.00%           0.480000
Germany           6.00%         12.00%           0.500000
  Japan           5.00%         10.00%           0.500000
     UK           7.00%         14.00%           0.500000
  India          15.00%         30.00%           0.500000
 Brazil          11.00%         22.00%           0.500000

Maximum Sharpe Ratio Portfolio

This portfolio optimizes risk-adjusted returns and typically shows:

• Heavy allocation to high-return, moderate-risk countries (like India and Brazil)
• Diversification across uncorrelated markets to reduce overall risk
• Minimal allocation to low-return countries unless they provide significant diversification benefits

Minimum Variance Portfolio

This conservative approach focuses on risk reduction:

• Higher weights in stable, low-volatility partners (like Germany and Japan)
• Broad diversification to minimize correlation risk
• Lower expected returns but significantly reduced volatility

Economic Interpretation

The efficient frontier demonstrates the fundamental trade-off in international trade strategy:

Expected Benefit=f(Risk Tolerance,Diversification,Partner Characteristics)

Countries closer to the efficient frontier offer better risk-adjusted trade opportunities. The optimal allocation depends on the country’s:

• Risk appetite: More conservative countries should choose portfolios closer to the minimum variance point
• Growth objectives: Countries prioritizing economic growth might prefer higher-risk, higher-return allocations
• Existing relationships: Political and historical ties may constrain the theoretical optimal allocation

Practical Applications

This framework can be extended for real-world trade policy decisions by:

1. Using actual trade flow data to estimate returns and correlations
2. Incorporating political risk factors into the covariance matrix
3. Adding constraints for strategic partnerships or trade agreements
4. Dynamic rebalancing as economic conditions change

The mathematical rigor of modern portfolio theory provides policymakers with a quantitative foundation for strategic trade diversification decisions, moving beyond intuition to data-driven optimization.

A Practical Approach with Python

Quantum dots have revolutionized nanotechnology with their unique size-dependent optical and electronic properties. Today, we’ll dive deep into optimizing quantum dot design using Python, focusing on a practical example that demonstrates how computational methods can guide experimental synthesis.

Problem Statement

We’ll tackle a common optimization challenge: designing spherical semiconductor quantum dots (CdSe) to achieve specific optical properties. Our goal is to find the optimal dot size and composition that maximizes photoluminescence quantum yield while targeting a specific emission wavelength.

The quantum confinement effect in quantum dots can be described by the effective mass approximation:

Eeffg=Ebulkg+ℏ2π22R2(1m∗e+1m∗h)−1.8e24πϵϵ0R

Where:

• Eeffg is the effective bandgap
• Ebulkg is the bulk bandgap
• R is the quantum dot radius
• m∗e and m∗h are effective masses of electron and hole
• ϵ is the dielectric constant

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