Asymptotic limit of cumulants and higher order free cumulants of complex Wigner matrices

Abstract

We compute the fluctuation moments αm1,…,mr of a Complex Wigner Matrix XN given by the limit N→∞Nr-2kr(Tr(XNm1),…,Tr(XNmr)). We prove the limit exists and characterize the leading order via planar graphs that result to be trees. We prove these graphs can be counted by the set of non-crossing partitioned permutations which permit us to express the moments αm1,…,mr in terms of simpler quantities m1,…,mr known as the higher order cumulants. As for lower order dimensions (r ≤ 3) we observe that while the moments have a more elaborated expression the cumulants are simpler.

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