Isometric group actions on Banach spaces and representations vanishing at infinity
Abstract
Our main result is that the simple Lie group G=Sp(n,1) acts properly isometrically on Lp(G) if p>4n+2. To prove this, we introduce property (0V), for V be a Banach space: a locally compact group G has property (0V) if every affine isometric action of G on V, such that the linear part is a C0-representation of G, either has a fixed point or is metrically proper. We prove that solvable groups, connected Lie groups, and linear algebraic groups over a local field of characteristic zero, have property (0V). As a consequence for unitary representations, we characterize those groups in the latter classes for which the first cohomology with respect to the left regular representation on L2(G) is non-zero; and we characterize uniform lattices in those groups for which the first L2-Betti number is non-zero.
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