Local rigidity for actions of Kazhdan groups on non commutative Lp-spaces

Abstract

Given a discrete group , a finite factor N and a real number p∈ [1, +∞) with p≠ 2, we are concerned with the rigidity of actions of by linear isometries on the Lp-spaces Lp( N) associated to N. More precisely, we show that, when and N have both Property (T) and under some natural ergodicity condition, such an action π is locally rigid in the group G of linear isometries of Lp( N), that is, every sufficiently small perturbation of π is conjugate to π under G. As a consequence, when is an ICC Kazhdan group, the action of on its von Neumann algebra N(), given by conjugation, is locally rigid in the isometry group of Lp( N()).