Geometry-induced criticality in p-adic scaling limits of random walks

Abstract

An anisotropy parameter h in (0,1] induces on Qp2 a duality-compatible, two-scale filtration that collapses to one scale at the right endpoint. This filtration defines shell-uniform transition laws for hierarchical random walks on a discrete group whose scaling limits are L\'evy processes on Qp2. The diffusion constants of the coordinate processes jump at the right endpoint, even though the radial jump law depends continuously on h. This instance of geometry-induced criticality isolates a structural mechanism that should extend to locally compact abelian groups and suggests a route to studying critical behavior in ultrametric models.