English

Conformal measure rigidity for representations via self-joinings

Geometric Topology 2024-10-21 v2 Dynamical Systems Group Theory

Abstract

Let Γ\Gamma be a Zariski dense discrete subgroup of a connected simple real algebraic group G1G_1. We discuss a rigidity problem for discrete faithful representations ρ:ΓG2\rho:\Gamma\to G_2 and a surprising role played by higher rank conformal measures of the associated self-joining group. Our approach recovers rigidity theorems of Sullivan, Tukia and Yue, as well as applies to Anosov representations, including Hitchin representations. More precisely, for a given representation ρ\rho with a boundary map ff defined on the limit set Λ\Lambda, we ask whether the extendability of ρ\rho to GG can be detected by the property that ff pushes forward some Γ\Gamma-conformal measure class [νΓ][\nu_\Gamma] to a ρ(Γ)\rho(\Gamma)-conformal measure class [νρ(Γ)][\nu_{\rho(\Gamma)}]. When Γ\Gamma is of divergence type in a rank one group or when ρ\rho arises from an Anosov representation, we give an affirmative answer by showing that if the self-joining Γρ=(id×ρ)(Γ)\Gamma_\rho=(\text{id} \times \rho)(\Gamma) is Zariski dense in G1×G2G_1\times G_2, then the push-forward measures (id×f)νΓ(\text{id}\times f)_*\nu_\Gamma and (f1×id)νρ(Γ)(f^{-1}\times \text{id})_*\nu_{\rho(\Gamma)}, which are higher rank Γρ\Gamma_\rho-conformal measures, cannot be in the same measure class.

Keywords

Cite

@article{arxiv.2302.03539,
  title  = {Conformal measure rigidity for representations via self-joinings},
  author = {Dongryul M. Kim and Hee Oh},
  journal= {arXiv preprint arXiv:2302.03539},
  year   = {2024}
}

Comments

36 pages, 1 figure, To appear in Advances in Math

R2 v1 2026-06-28T08:34:15.203Z