Delocalization and continuous spectrum for ultrametric random operators

Abstract

This paper studies the delocalized regime of an ultrametric random operator whose independent entries have variances decaying in a suitable hierarchical metric on N. When the decay-rate of the off-diagonal variances is sufficiently slow, we prove that the spectral measures are uniformly θ-H\"older continuous for all θ ∈ (0,1). In finite volumes, we prove that the corresponding ultrametric random matrices have completely extended eigenfunctions and that the local eigenvalue statistics converge in the Wigner-Dyson-Mehta universality class.