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Article Dans Une Revue Cambridge Journal of Mathematics Année : 2022

On the operator norm of non-commutative polynomials in deterministic matrices and iid GUE matrices

Résumé

Let X^N = (X^N_1 , ... , X^N_d) be a d-tuple of N × N independent GUE random matrices and Z^{NM} be any family of deterministic matrices in M_N(C) ⊗ M_M (C). Let P be a self-adjoint non-commutative polynomial. A seminal work of Voiculescu shows that the empirical measure of the eigenvalues of P(X^N) converges towards a deterministic measure defined thanks to free probability theory. Let now f be a smooth function, the main technical result of this paper is a precise bound of the difference between the expectation of 1/(MN) Tr ⊗ Tr( f(P (X^N ⊗ I_M , Z^{NM}) ) , and its limit when N goes to infinity. If f is six times differentiable, we show that it is of order M^2 N^{−2} and we compute an explicit upper bound of the difference. As a corollary we obtain a new proof and slightly improve a result of Haagerup and Thorbjørnsen, later developed by Male, which gives sufficient conditions for the operator norm of a polynomial evaluated in (X^N , Z^{NM}, Z^{NM}*) to converge almost surely towards its free limit.
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Dates et versions

ensl-03049388 , version 1 (09-12-2020)

Identifiants

  • HAL Id : ensl-03049388 , version 1

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Benoît Collins, Alice Guionnet, Félix Parraud. On the operator norm of non-commutative polynomials in deterministic matrices and iid GUE matrices. Cambridge Journal of Mathematics, 2022, 10 (1), pp.195-260. ⟨ensl-03049388⟩

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