English

Special affine representations for hyperbolic groups

Group Theory 2024-02-28 v2 Dynamical Systems Operator Algebras

Abstract

In this paper we extend the construction of special representations to Gromov hyperbolic groups which admits complementary series. We prove that these representations have a natural non-trivial reduced cohomology class [c][c]. An analogue of Kuhn-Vershik's formula is established and as a by-product a characterisation of hyperbolic groups that admit complementary series. Investigating dynamical properties of the cohomology class [c][c] we prove an cocycle equidistribution theorem \'a la Roblin-Margulis and deduce the irreducibility of the associated affine actions. The irreducibility of the affine actions associated to the canonical class [c][c] is original even in the case of uniform lattices in SO(n,1)SO(n,1), SU(n,1)SU(n,1) or SL2(Qp)SL_2(\mathbb{Q}_p) with n1n\ge 1 and pp prime.

Keywords

Cite

@article{arxiv.2012.00427,
  title  = {Special affine representations for hyperbolic groups},
  author = {Kevin Boucher},
  journal= {arXiv preprint arXiv:2012.00427},
  year   = {2024}
}

Comments

changes in the formalism and the structure of the article. The main results are improved from CAT(-1) to hyperbolic and certain proofs are simplified

R2 v1 2026-06-23T20:38:10.648Z