Some Mixed-Moments of Gaussian Elliptic Matrices and Ginibre Matrices

Abstract

We consider the mixed-moments (Xε1,…,Xεk)=N∞N-1E[Tr(Xε1·sXεk)] of complex Gaussian Elliptic Matrices X (with correlation parameter between elements Xij and Xji*), where symbolically εi∈\1,\, and where the expectation E[·] is taken over all matrices X. We start by finding an explicit formula for (Xn,(X)m), n,m∈N, by using a mapping between non-crossing pairings on =n+m elements and Temperley-Lieb diagrams between two strands of n and m elements. This formula allows for a numerically efficient way to compute (Xn,(X)m) by reducing the exponential complexity of a naive enumeration of non-crossing pairings to polynomial complexity. We also provide the asymptotic behavior of these mixed-moments as n,m∞. We then provide an explicit computation for some more general mixed-moments by considering the position of the matrix X in the product Xε1·sXεk. We, therefore, deduce closed-form formulas for some mixed-moments of Ginibre matrices.

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