Spectral distribution of the free Jacobi process associated with one projection

Nizar Demni; Taoufik Hmidi

Colloquium Mathematicae (2014)

  • Volume: 137, Issue: 2, page 271-296
  • ISSN: 0010-1354

Abstract

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Given an orthogonal projection P and a free unitary Brownian motion Y = ( Y ) t 0 in a W*-non commutative probability space such that Y and P are *-free in Voiculescu’s sense, we study the spectral distribution νₜ of Jₜ = PYₜPYₜ*P in the compressed space. To this end, we focus on the spectral distribution μₜ of the unitary operator SYₜSYₜ*, S = 2P - 1, whose moments are related to those of Jₜ via a binomial-type expansion already obtained by Demni et al. [Indiana Univ. Math. J. 61 (2012)]. In this connection, we use free stochastic calculus in order to derive a partial differential equation for the Herglotz transform μₜ. Then, we exhibit a flow ψ(t,·) valued in [-1,1] such that the composition of the Herglotz transform with the flow is governed by both the ones of the initial and the stationary distributions μ₀ and μ . This enables us to compute the weights μₜ1 and μₜ-1 which together with the binomial-type expansion lead to νₜ1 and νₜ0. Fatou’s theorem for harmonic functions in the upper half-plane shows that the absolutely continuous part of νₜ is related to the nontangential extension of the Herglotz transform of μₜ to the unit circle. In the last part of the paper, we use combinatorics of noncrossing partitions in order to analyze the term corresponding to the exponential decay e - n t in the expansion of the nth moment of μₜ.

How to cite

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Nizar Demni, and Taoufik Hmidi. "Spectral distribution of the free Jacobi process associated with one projection." Colloquium Mathematicae 137.2 (2014): 271-296. <http://eudml.org/doc/283489>.

@article{NizarDemni2014,
abstract = {Given an orthogonal projection P and a free unitary Brownian motion $Y = (Yₜ)_\{t≥0\}$ in a W*-non commutative probability space such that Y and P are *-free in Voiculescu’s sense, we study the spectral distribution νₜ of Jₜ = PYₜPYₜ*P in the compressed space. To this end, we focus on the spectral distribution μₜ of the unitary operator SYₜSYₜ*, S = 2P - 1, whose moments are related to those of Jₜ via a binomial-type expansion already obtained by Demni et al. [Indiana Univ. Math. J. 61 (2012)]. In this connection, we use free stochastic calculus in order to derive a partial differential equation for the Herglotz transform μₜ. Then, we exhibit a flow ψ(t,·) valued in [-1,1] such that the composition of the Herglotz transform with the flow is governed by both the ones of the initial and the stationary distributions μ₀ and $μ_\{∞\}$. This enables us to compute the weights μₜ1 and μₜ-1 which together with the binomial-type expansion lead to νₜ1 and νₜ0. Fatou’s theorem for harmonic functions in the upper half-plane shows that the absolutely continuous part of νₜ is related to the nontangential extension of the Herglotz transform of μₜ to the unit circle. In the last part of the paper, we use combinatorics of noncrossing partitions in order to analyze the term corresponding to the exponential decay $e^\{-nt\}$ in the expansion of the nth moment of μₜ.},
author = {Nizar Demni, Taoufik Hmidi},
journal = {Colloquium Mathematicae},
keywords = {free unitary Brownian motion; free Jacobi process; Herglotz transform; spectral distribution},
language = {eng},
number = {2},
pages = {271-296},
title = {Spectral distribution of the free Jacobi process associated with one projection},
url = {http://eudml.org/doc/283489},
volume = {137},
year = {2014},
}

TY - JOUR
AU - Nizar Demni
AU - Taoufik Hmidi
TI - Spectral distribution of the free Jacobi process associated with one projection
JO - Colloquium Mathematicae
PY - 2014
VL - 137
IS - 2
SP - 271
EP - 296
AB - Given an orthogonal projection P and a free unitary Brownian motion $Y = (Yₜ)_{t≥0}$ in a W*-non commutative probability space such that Y and P are *-free in Voiculescu’s sense, we study the spectral distribution νₜ of Jₜ = PYₜPYₜ*P in the compressed space. To this end, we focus on the spectral distribution μₜ of the unitary operator SYₜSYₜ*, S = 2P - 1, whose moments are related to those of Jₜ via a binomial-type expansion already obtained by Demni et al. [Indiana Univ. Math. J. 61 (2012)]. In this connection, we use free stochastic calculus in order to derive a partial differential equation for the Herglotz transform μₜ. Then, we exhibit a flow ψ(t,·) valued in [-1,1] such that the composition of the Herglotz transform with the flow is governed by both the ones of the initial and the stationary distributions μ₀ and $μ_{∞}$. This enables us to compute the weights μₜ1 and μₜ-1 which together with the binomial-type expansion lead to νₜ1 and νₜ0. Fatou’s theorem for harmonic functions in the upper half-plane shows that the absolutely continuous part of νₜ is related to the nontangential extension of the Herglotz transform of μₜ to the unit circle. In the last part of the paper, we use combinatorics of noncrossing partitions in order to analyze the term corresponding to the exponential decay $e^{-nt}$ in the expansion of the nth moment of μₜ.
LA - eng
KW - free unitary Brownian motion; free Jacobi process; Herglotz transform; spectral distribution
UR - http://eudml.org/doc/283489
ER -

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