Abstract
While univariate nonparametric estimation methods have been developed for estimating returns in mean-downside risk portfolio optimization, the problem of handling possible cross-correlations in a vector of asset returns has not been addressed in portfolio selection. We present a novel multivariate nonparametric portfolio optimization procedure using kernel-based estimators of the conditional mean and the conditional median. The method accounts for the covariance structure information from the full set of returns. We also provide two computational algorithms to implement the estimators. Via the analysis of 24 French stock market returns, we evaluate the in-sample and out-of-sample performance of both portfolio selection algorithms against optimal portfolios selected by classical and univariate nonparametric methods for three highly different time periods and different levels of expected return. By allowing for cross-correlations among returns, our results suggest that the proposed multivariate nonparametric method is a useful extension of standard univariate nonparametric portfolio selection approaches.
Highlights
Modern portfolio theory (MPT) is one of the most applied and recognized investment approaches used by investors today
We propose multivariate nonparametric estimators of the conditional mean and conditional median for mean–downside risk (DSR) optimization
The estimators account for possible interrelationships between asset returns, as for instance quantified by cross-correlations
Summary
Modern portfolio theory (MPT) is one of the most applied and recognized investment approaches used by investors today. By quantifying investment risk in the form of the mean, variance, and covariance of returns, Markowitz gave investors a mathematical approach to asset selection and portfolio management. The major contribution is to replace returns by their mean kernel estimates (nonparametric mean regression) The advantage of this technique is to provide an effect similar to the case in which observations are continuous yielding a smoother portfolio frontier. The proposed approach is multivariate and based on vectorial nonparametric estimation of returns using multivariate mean and median It has the advantage of taking into consideration the possible correlation between asset returns without specifying any specific dependence structure.
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