Covariance Matrix Analysis for Optimal Portfolio Selection

arXiv - QuantFin - Portfolio Management Pub Date : 2024-06-23 DOI:arxiv-2407.08748

Lim Hao Shen Keith

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Abstract

In portfolio risk minimization, the inverse covariance matrix of returns is often unknown and has to be estimated in practice. This inverse covariance matrix also prescribes the hedge trades in which a stock is hedged by all the other stocks in the portfolio. In practice with finite samples, however, multicollinearity gives rise to considerable estimation errors, making the hedge trades too unstable and unreliable for use. By adopting ideas from current methodologies in the existing literature, we propose 2 new estimators of the inverse covariance matrix, one which relies only on the l2 norm while the other utilizes both the l1 and l2 norms. These 2 new estimators are classified as shrinkage estimators in the literature. Comparing favorably with other methods (sample-based estimation, equal-weighting, estimation based on Principal Component Analysis), a portfolio formed on the proposed estimators achieves substantial out-of-sample risk reduction and improves the out-of-sample risk-adjusted returns of the portfolio, particularly in high-dimensional settings. Furthermore, the proposed estimators can still be computed even in instances where the sample covariance matrix is ill-conditioned or singular

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优化投资组合选择的协方差矩阵分析

在投资组合风险最小化中，收益的逆协方差矩阵往往是未知的，必须在实践中进行估计。这个逆协方差矩阵还规定了对冲交易，其中一只股票与投资组合中的其他所有股票进行对冲。然而，在有限样本的实践中，多重共线性会导致相当大的估计误差，使对冲交易过于不稳定和不可靠。通过采用现有文献中的方法，我们提出了两个新的逆协方差矩阵估计器，其中一个仅依赖于 l2 准则，而另一个则同时利用了 l1 和 l2 准则。这两个新估计器在文献中被归类为收缩估计器。与其他方法（基于样本的估计法、等权法、基于主要成分分析的估计法）相比，基于所提出的估计器形成的投资组合能大幅降低样本外风险，并提高投资组合的样本外风险调整收益，尤其是在高维环境下。此外，即使在样本协方差矩阵无条件或奇异的情况下，也能计算所提出的估计器。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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arXiv - QuantFin - Portfolio Management

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