Rigidity of Kleinian groups via self-joinings: measure theoretic criterion

Abstract

Let n, m 2. Let <SO(n+1,1) be a Zariski dense convex cocompact subgroup and ⊂Sn be its limit set. Let : SO(m+1,1) be a Zariski dense convex cocompact faithful representation and f: Sm the -boundary map. Let f:= \ C : matrix C ⊂ Sn is a circle such that \\ f(C ) is contained in a proper sphere in Sm matrix \. When there exists at least one -doubly stable circle in Sn (e.g., =Sn- is disconnected), we prove the following dichotomy: either f= or Hδ(f) =0, where Hδ is the Hausdorff measure of dimension δ=H . Moreover, in the former case, we have n=m and is a conjugation by a M\"obius transformation on Sn. Our proof uses ergodic theory for directional diagonal flows and conformal measure theory of discrete subgroups of higher rank semisimple Lie groups, applied to the self-joining subgroup =(id × )() < SO(n+1,1)× SO(m+1,1). We also obtain an analogous theorem for any divergence-type subgroup.