论文信息 - The complex Wishart distribution and the symmetric group

The complex Wishart distribution and the symmetric group

Let V be the space of (r, r) Hermitian matrices and let Ω be the cone of the positive definite ones. We say that the random variable S, taking its values in Ω, has the complex Wishart distribution γ p,σ if E(exp trace (θ S)) = (det(I r - σθ)) -p , where a and σ -1 - θ are in Ω, and where p = 1, 2,..., r - 1 or p > r - 1. In this paper, we compute all moments of S and S -1 . The techniques involve in particular the use of the irreducible characters of the symmetric group.

H. Massam | P. Graczyk | G. Letac

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