On Efficient Sampling Schemes for the Eigenvalues of Complex Wishart Matrices

Abstract

The paper "An efficient sampling scheme for the eigenvalues of dual Wishart matrices", by I.~Santamar\'ia and V.~Elvira, [IEEE Signal Processing Letters, vol.~28, pp.~2177--2181, 2021] SE21, poses the question of efficient sampling from the eigenvalue probability density function of the n × n central complex Wishart matrices with variance matrix equal to the identity. Underlying such complex Wishart matrices is a rectangular R × n (R n) standard complex Gaussian matrix, requiring then 2Rn real random variables for their generation. The main result of SE21 gives a formula involving just two classical distributions specifying the two eigenvalues in the case n=2. The purpose of this Letter is to point out that existing results in the literature give two distinct ways to efficiently sample the eigenvalues in the general n case. One is in terms of the eigenvalues of a tridiagonal matrix which factors as the product of a bidiagonal matrix and its transpose, with the 2n+1 nonzero entries of the latter given by (the square root of) certain chi-squared random variables. The other is as the generalised eigenvalues for a pair of bidiagonal matrices, also containing a total of 2n+1 chi-squared random variables. Moreover, these characterisation persist in the case of that the variance matrix consists of a single spike, and for the case of real Wishart matrices.