Fixed-point spectrum for group actions by affine isometries on Lp-spaces

Abstract

The fixed-point spectrum of a locally compact second countable group G on lp is defined to be the set of real numbers p such that every action by affine isometries of G on lp admits a fixed-point. We show that this set is either empty, or is equal to a set of one of the following forms : [1,[, [1,[\2 for some <∞ or =∞, or [1,], [1,]\2 for some pc<infty. This answers a question closely related to a conjecture of C. Drutu which asserts that the fixed-point spectrum is connected for isometric actions on Lp(0,1). We also study the topological properties of the fixed-point spectrum on Lp(X,μ) for general measure spaces (X,μ), and show partial results toward the conjecture for actions on Lp(0,1). In particular, we prove that the spectrum FL∞(X,μ)(G,π) of actions with linear part π is either empty, or an interval of the form [1,] or [1,∞[, whenever π is an orthogonal representation associated to a measure-preserving ergodic action on a finite measure space (X,μ).