Convergence rate of the diagonal-valued Cauchy-transform for permutation invariant random matrices

Abstract

Let A be a permutation invariant random matrix and B another random matrix. We give a quantitative bound on the difference between the diagonal of the resolvent of A+B and the diagonal of the resolvent of the free sum with amalgamation over the diagonal of A and B. Moreover, we improve the rate of convergence whenever the matrices A and B are sparse and bounded in operator norm. Doing so, we explicitly construct the free sum over the diagonal of A and B as an adjacency operator of a weighted locally finite graph.

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