General moments of the inverse real Wishart distribution and orthogonal Weingarten functions
Abstract: Let $W$ be a random positive definite symmetric matrix distributed according to a real Wishart distribution and let $W{-1}=(W{ij})_{i,j}$ be its inverse matrix. We compute general moments $\mathbb{E} [W{k_1 k_2} W{k_3 k_4} ... W{k_{2n-1}k_{2n}}]$ explicitly. To do so, we employ the orthogonal Weingarten function, which was recently introduced in the study for Haar-distributed orthogonal matrices. As applications, we give formulas for moments of traces of a Wishart matrix and its inverse.
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