Finite-Dimensional Representations constructed from Random Walks

Abstract

Given a 1-cocycle b with coefficients in an orthogonal representation, we show that any finite dimensional summand of b is cohomologically trivial if and only if \| b(Xn) \|2/n tends to a constant in probability, where Xn is the trajectory of the random walk (G,μ). As a corollary, we obtain sufficient conditions for G to satisfy Shalom's property HFD. Another application is a convergence to a constant in probability of μ*n(e) -μ*n(g), n m, normalized by its average with respect to μ*m, for any finitely generated amenable group without infinite virtually Abelian quotients. Finally, we show that the harmonic equivariant mapping of G to a Hilbert space obtained as an U-ultralimit of normalized μ*n- g μ*n can depend on the ultrafilter U for some groups.