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Main Author: Hora, Akihito
Format: Preprint
Published: 2025
Subjects:
Online Access:https://arxiv.org/abs/2509.07393
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author Hora, Akihito
author_facet Hora, Akihito
contents The branching rule for the tower of wreath products of a finite group by the symmetric groups induces a stochastic process on the set of multiple Young diagrams through random transitions of boxes of the diagrams between one another. We observe dynamical multiple averaged limit shapes resulting from appropriate scaling limits, either diffusive or non-diffusive. We describe time evolution of the macroscopic multiple averaged limit shapes in terms of Voiculescu's $R$-transforms and free Lévy measures of corresponding Kerov transition measures. Our microscopic dynamics admits non-exponential pausing time distributions.
format Preprint
id arxiv_https___arxiv_org_abs_2509_07393
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Time evolution of averaged limit shapes of random multiple Young diagrams
Hora, Akihito
Probability
Representation Theory
82C41, 60J28, 46L54, 20C30, 20C35
The branching rule for the tower of wreath products of a finite group by the symmetric groups induces a stochastic process on the set of multiple Young diagrams through random transitions of boxes of the diagrams between one another. We observe dynamical multiple averaged limit shapes resulting from appropriate scaling limits, either diffusive or non-diffusive. We describe time evolution of the macroscopic multiple averaged limit shapes in terms of Voiculescu's $R$-transforms and free Lévy measures of corresponding Kerov transition measures. Our microscopic dynamics admits non-exponential pausing time distributions.
title Time evolution of averaged limit shapes of random multiple Young diagrams
topic Probability
Representation Theory
82C41, 60J28, 46L54, 20C30, 20C35
url https://arxiv.org/abs/2509.07393