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Strong asymptotic freeness for Wigner and Wishart matrices

Abstract

We prove that any non commutative polynomial of r independent copies of Wigner matrices converges a.s. towards the polynomial of r free semicircular variables in operator norm. This result extends a previous work of Haagerup and Thorbjornsen where GUE matrices are considered, as well as the classical asymptotic freeness for Wigner matrices (i.e. convergence of the moments) proved by Dykema. We also study the Wishart case.

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Probability [math.PR]
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https://hal.science/hal-00004770

Submitted on : Wednesday, April 20, 2005-4:09:17 PM

Last modification on : Tuesday, April 16, 2024-1:13:23 PM

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hal-00004770 , version 1 (20-04-2005)

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Mireille Capitaine, Catherine Donati-Martin. Strong asymptotic freeness for Wigner and Wishart matrices. 2005. ⟨hal-00004770⟩

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