On groups with Property (Tlp)

Abstract

Let p be a real number with 1<p and different from 2. We study Property (Tlp) for a second countable locally compact group G. Property (Tlp) is a weak version of Kazhdan's Property (T), defined in terms of the orthogonal representations of G on the sequence space lp. We show that Property (Tlp) for a totally disconnected group G is characterized by an isolation property of the trivial representation from the quasi-regular representations associated to open subgroups of G. Groups with Property (Tlp) share some important properties with Kazhdan groups (compact generation, compact abelianization, ...). Simple algebraic groups over non-archimedean local fields as well as automorphism groups of regular trees have Property (Tlp). In the case of discrete groups, Property (Tlp) implies Lubotzky's Property tau and is implied by Property (F) of Glasner and Monod. We show that an irreducible lattice in a product of two locally compact groups G and H have Property (Tlp), whenever G has Property (T) and H is connected and minimally almost periodic.