-Harmonic Functions on Discrete Groups and First -Cohomology

Abstract

We study the first cohomology groups of a countable discrete group G with coefficients in a G-module (G), where is an N-function of class 2(0) ∇2(0). In development of ideas of Puls and Martin--Valette, for a finitely generated group G, we introduce the discrete -Laplacian and prove a theorem on the decomposition of the space of -Dirichlet finite functions into the direct sum of the spaces of -harmonic functions and (G) (with an appropriate factorization). We also prove that if a finitely generated group G has a finitely generated infinite amenable subgroup with infinite centralizer then H1(G,(G)) = 0. In conclusion, we show the triviality of the first cohomology group for a wreath product of two groups one of which is nonamenable.