Hausdorff dimension of directional limit sets for self-joinings of hyperbolic manifolds

Abstract

The classical result of Patterson and Sullivan says that for a non-elementary convex cocompact subgroup <SO (n,1), n 2, the Hausdorff dimension of the limit set of is equal to the critical exponent of . In this paper, we generalize this result for self-joinings of convex cocompact groups in two ways. Let be a finitely generated group and i: SO(ni,1) be a convex cocompact faithful representation of for 1 i k. Associated to =(1, ·s, k), we consider the following self-joining subgroup of Πi=1k SO(ni,1): =(Πi=1ki)()=\(1(g), ·s, k(g)):g∈ \ . (1). Denoting by ⊂ Πi=1k Sni-1 the limit set of , we first prove that dimH =1 i k δ_i where δ_i is the critical exponent of the subgroup i(). (2). Denoting by u⊂ the u-directional limit set for each u=(u1, ·s, uk) in the interior of the limit cone of , we obtain that for k 3, (u)i ui dimH u (u)i ui where :Rk R\-∞\ is the growth indicator function of .