Property (FLp) implies property (FLq) for 1<q<p<∞

Abstract

It is known that for σ-compact groups Kazhdan's Property (T) is equivalent to Serre's Property (FH). Generalized versions of those properties, called properties (TB) and (FB), can be defined in terms of the isometric representations of a group on an arbitrary Banach space B. Property (FB) implies (TB). It is known that a group with Property (Tlp) shares some properties with Kazhdan's groups, for example compact generation and compact abelianization. Moreover in the case of discrete groups, Property (Tlp) implies Lubotzky's Property (τ). In this paper we prove that in the case of discrete groups and 1<p<q<∞ and p=2, Property (Flq) implies Property (Flp).