Property (TL) and property (FL) for Orlicz spaces L^

Abstract

An Orlicz space L() is a Banach function space defined by using a Young function , which generalizes the Lp spaces. We show that, for a reflexive Orlicz space L([0,1]), a locally compact second countable group has Kazhdan's property (T) if and only if it has property (TL([0,1])), which is a generalization of Kazhdan's property (T) for linear isometric representations on L([0,1]). We also prove that, for a Banach space B whose modulus of convexity is sufficiently large, if a locally compact second countable group has Kazhdan's property (T), then it has property (FB), which is a fixed point property for affine isometric actions on B. Moreover, we see that, for an Orlicz sequence space such that the Young function sufficiently rapidly increases near 0, hyperbolic groups (with Kazhdan's property (T)) don't have property (F). These results are generalizations of the results for Lp-spaces.