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shyam gupta
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README.md
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@@ -47,23 +47,32 @@ Mean-Variance Portfolio Optimization is a widely used method in finance for cons
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Methodology
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1. Basic Concepts
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Risk (Variance): A measure of the dispersion of returns. In portfolio optimization, we seek to minimize the variance of the portfolio returns.
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Our implementation utilizes the following steps:
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Input Data: Historical returns for each asset in the portfolio.
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Objective Function: Construct an objective function that combines the expected return and variance.
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Optimization Algorithm: We employ a mean-variance optimization algorithm that iteratively adjusts the weights to find the optimal combination.
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Convergence Criteria: The algorithm iterates over a specified number of iterations (e.g., 5000) or until convergence is achieved.
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In our project, we have implemented the Mean-Variance Portfolio Optimization method with 5000 iterations. The process involves:
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Input: Historical return data for each equity in the Indian market.
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Objective: Maximize expected return while minimizing portfolio variance.
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Optimization: Utilize an iterative approach, adjusting weights to find the optimal allocation.
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Output: The final set of weights that represent the optimal portfolio allocation.
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#### Contributing
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Methodology
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1. Basic Concepts
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Expected Return: The anticipated gain or loss from an investment, based on historical data or other factors.
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Risk (Variance): A measure of the dispersion of returns. In portfolio optimization, we seek to minimize the variance of the portfolio returns.
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+
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3. Optimization Algorithm
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Our implementation utilizes the following steps:
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+
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Input Data: Historical returns for each asset in the portfolio.
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| 59 |
+
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Objective Function: Construct an objective function that combines the expected return and variance.
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+
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Optimization Algorithm: We employ a mean-variance optimization algorithm that iteratively adjusts the weights to find the optimal combination.
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+
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Convergence Criteria: The algorithm iterates over a specified number of iterations (e.g., 5000) or until convergence is achieved.
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4. Implementation
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In our project, we have implemented the Mean-Variance Portfolio Optimization method with 5000 iterations. The process involves:
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+
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Input: Historical return data for each equity in the Indian market.
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+
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Objective: Maximize expected return while minimizing portfolio variance.
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+
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Optimization: Utilize an iterative approach, adjusting weights to find the optimal allocation.
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+
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Output: The final set of weights that represent the optimal portfolio allocation.
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#### Contributing
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