Property (TB) and Property (FB) restricted to a representation without non-zero invariant vectors

Abstract

In this paper, we give a necessary and sufficient condition for which a finitely generated group has a property like Kazhdan's Property (T) restricted to one isometric representation on a strictly convex Banach space without non-zero invariant vectors. Similarly, we give a necessary and sufficient condition for which a finitely generated group has a property like Property (FH) restricted to the set of the affine isometric actions whose linear part are one isometric representation on a strictly convex Banach space without non-zero invariant vectors. If the Banach space is the p space (1<p<∞) on a finitely generated group, these conditions are regarded as an estimation of the spectrum of the p-Laplace operator on the p space and on the p-Dirichlet finite space respectively.