Reflecting Poisson walks and dynamical universality in p-adic random matrix theory

Abstract

We prove dynamical local limits for the singular numbers of p-adic random matrix products at both the bulk and edge. The limit object which we construct, the reflecting Poisson sea, may thus be viewed as a p-adic analogue of line ensembles appearing in classical random matrix theory. However, in contrast to those it is a discrete space Poisson-type particle system with only local reflection interactions and no obvious determinantal structure. The limits hold for any GLn(Zp)-invariant matrix distributions under weak universality hypotheses, with no spatial rescaling.

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