Unitary Lp+-representations of almost automorphism groups

Abstract

Let G be a locally compact group with an open subgroup H with the Kunze-Stein property, and let π be a unitary representation of H. We show that the representation π of G induced from π is an Lp+-representation if and only if π is an Lp+-representation. We deduce the following consequence for a large natural class of almost automorphism groups G of trees: For every p ∈ (2,∞), the group G has a unitary Lp+-representation that is not an Lq+-representation for any q < p. This in particular applies to the Neretin groups.