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Journal Articles Random Matrices: Theory and Applications Year : 2011

Truncations of Haar distributed matrices, traces and bivariate Brownian bridges.

Catherine Donati-Martin
Laboratoire de Probabilités et Modèles Aléatoires
Alain Rouault
Laboratoire de Mathématiques de Versailles

Abstract

Let U be a Haar distributed unitary matrix in U(n)or O(n). We show that after centering the double index process $$ W^{(n)} (s,t) = \sum_{i \leq \lfloor ns \rfloor, j \leq \lfloor nt\rfloor} |U_{ij}|^2 $$ converges in distribution to the bivariate tied-down Brownian bridge. The proof relies on the notion of second order freeness.

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Probability [math.PR]
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https://hal.science/hal-00498758

Submitted on : Monday, September 19, 2011-10:35:20 AM

Last modification on : Friday, April 5, 2024-10:14:05 AM

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Dates and versions

hal-00498758 , version 1 (08-07-2010)
hal-00498758 , version 2 (02-12-2010)
hal-00498758 , version 3 (15-02-2011)
hal-00498758 , version 4 (19-09-2011)

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Catherine Donati-Martin, Alain Rouault. Truncations of Haar distributed matrices, traces and bivariate Brownian bridges.. Random Matrices: Theory and Applications, 2011, 23 p. ⟨10.1142/S2010326311500079⟩. ⟨hal-00498758v4⟩

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