On fixed point property for Lp-representations of Kazhdan groups
Abstract
Let G be a topological group with finite Kazhdan set, let be a standard Borel space and μ a finite measure on . We prove that for any p∈ [1, ∞), any affine isometric action G Lp(, μ) whose linear part arises from an ergodic measure-preserving action G (, μ), has a fixed point.
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