Tangency portfolio weights under a skew-normal model in small and large dimensions

Abstract

In this paper, we investigate the distributional properties of the estimated tangency portfolio (TP) weights assuming that the asset returns follow a matrix variate closed skew-normal distribution. We establish a stochastic representation of the linear combination of the estimated TP weights that fully characterizes its distribution. Using the stochastic representation we derive the mean and variance of the estimated weights of TP which are of key importance in portfolio analysis. Furthermore, we provide the asymptotic distribution of the linear combination of the estimated TP weights under the high-dimensional asymptotic regime, i.e., the dimension of the portfolio p and the sample size n tend to infinity such that $p/n\to c\in (0,1).$ A good performance of the theoretical findings is documented in the simulation study. In an empirical study, we apply the theoretical results to real data of the stocks included in the S&P 500 index.

Keywords:

• Asset allocation
• tangency portfolio
• matrix variate skew-normal distribution
• stochastic representation
• high-dimensional asymptotics

Acknowledgment

The authors are thankful to Prof. Zhe George Zhang, the Associate Editor, and two anonymous Reviewers for the careful reading of the manuscript and for their suggestions that have improved an earlier version of this paper The authors acknowledge financial support from the project” Models for macro and financial economics after the financial crisis” (Dnr: P18-0201) funded by the Jan Wallander and Tom Hedelius Foundation. Farrukh Javed and Stepan Mazur also acknowledge financial support from the internal research grants of Örebro University.

Disclosure statement

No potential conflict of interest was reported by the author(s).

Notes

1 In the Bayesian framework, the posterior distribution of the TP weights is proportional to the product of (singular) Wishart matrix and (singular) normal vector under the assumption of normally distributed data. The distributional properties of these products are well studied by Bodnar et al. (2013, 2016), Bodnar et al. (2020), Bodnar et al. (2019).

2 Additionally assuming that rank ($\mathbf{\Sigma }$) = $r\le n-1,$ Bodnar et al. (2016, 2017) and Bodnar et al. (2019) employed the Moore-Penrose inverse in the portfolio context. One can also make use of different regularization methods such as the ridge-type approach (Tikhonov & Arsenin, 1977), the Landweber-Fridman algorithm (Kress, 1999), the spectral cut-off approach (Chernousova & Golubev, 2014), the Lasso-type method (Brodie et al., 2009), and an iterative method based on a second order damped dynamical systems (Gulliksson et al., 2023; Gulliksson & Mazur, 2020).

Additional information

Funding

This work was supported by the Jan Wallanders och Tom Hedelius Stiftelse samt Tore Browaldhs Stiftelse.