Singular Inverse Wishart Distribution with Application to Portfolio Theory

Authors

  • Taras Bodnar Department of Mathematics, Stockholm University, Roslagsvagen 101, SE-10691 Stockholm, Sweden
  • Stepan Mazur Department of Statistics Lund University School of Economics and Management Box 743, SE-22007 Lund, Sweden
  • Krzysztof Podgorski Department of Statistics Lund University School of Economics and Management Box 743, SE-22007 Lund, Sweden

Keywords:

singular Wishart distribution, mean-variance portfolio, sample estimate of precision matrix, Moore-Penrose inverse

Abstract

The inverse of the standard estimate of covariance matrix is frequently used in the portfolio theory to estimate the optimal portfolio weights. For this problem, the distribution of the linear transformation of the inverse is needed. We obtain this distribution in the case when the sample size is smaller than the dimension, the underlying covariance matrix is singular, and the vectors of returns are independent and normally distributed. For the result, the distribution of the inverse of covariance estimate is needed and it is derived and referred to as the singular inverse Wishart distribution. We use these results to provide an explicit stochastic representation of an estimate of the mean-variance portfolio weights as well as to derive its characteristic function and the moments of higher order.

 

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Working Papers in Statistics