English

Finite-Dimensional Representations constructed from Random Walks

Functional Analysis 2017-11-07 v3 Group Theory Probability

Abstract

Given a 11-cocycle bb with coefficients in an orthogonal representation, we show that any finite dimensional summand of bb is cohomologically trivial if and only if b(Xn)2/n\| b(X_n) \|^2/n tends to a constant in probability, where XnX_n is the trajectory of the random walk (G,μ)(G,\mu). As a corollary, we obtain sufficient conditions for GG to satisfy Shalom's property HFDH_{\mathrm{FD}}. Another application is a convergence to a constant in probability of μn(e)μn(g)\mu^{*n}(e) -\mu^{*n}(g), nmn\gg m, normalized by its average with respect to μm\mu^{*m}, for any finitely generated amenable group without infinite virtually Abelian quotients. Finally, we show that the harmonic equivariant mapping of GG to a Hilbert space obtained as an UU-ultralimit of normalized μngμn\mu^{*n}- g \mu^{*n} can depend on the ultrafilter UU for some groups.

Keywords

Cite

@article{arxiv.1609.08585,
  title  = {Finite-Dimensional Representations constructed from Random Walks},
  author = {Anna Erschler and Narutaka Ozawa},
  journal= {arXiv preprint arXiv:1609.08585},
  year   = {2017}
}

Comments

22 pages; typos fixed (v2); Section 4 revised to cover locally compact groups (v3)

R2 v1 2026-06-22T16:03:13.481Z