A Local Limit Theorem and Delocalization of Eigenvectors for Polynomials in Two Matrices
Abstract
We propose a boundary regularity condition for the Mn(C)-valued subordination functions in free probability to prove the local limit theorem and delocalization of eigenvectors for polynomials in two random matrices. We prove this through estimating the pair of Mn(C)-valued approximate subordination functions for the sum of two Mn(C)-valued random matrices γ1 CN+γ2 UN*DNUN, where CN, DN are deterministic diagonal matrices, and UN is Haar unitary.
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