Jucys--Murphy Elements for Wreath Products and Their Application to Dynamical Random Multi-Diagrams

Abstract

The equivalence classes of irreducible representations of wreath product Sn(T) = Tn Sn of finite group T with respect to symmetric group Sn are parametrized by Yn(T), the T-tuple Young diagrams with total size n. We show a formula connecting the Kerov transition measures of these Young diagrams with the Jucys--Murphy elements of Sn(T). This formula is due to Biane in the case of symmetric groups. The formula enables us to investigate asymptotic property of the shapes of multi-diagrams through combinatorial analysis for the Jucys--Murphy elements. On the other hand, a Markov chain is introduced on Yn(T), canonically reflecting the branching rule for the tower of wreath product groups. We have a continuous time stochastic process on Yn(T) from this chain by replacing the discrete time by a counting process. Our project is to specify the deterministic limit shape of multi-diagrams at each macroscopic time through appropriate space-time scaling limit, and to describe evolution of related quantities characterizing the shape. Especially, we derive dynamical concentrated limit shapes in the case of abelian T by using free probability tools under the assumption of approximate factorization property for initial ensembles with an additional property of a pausing time distribution.