Rigidity of locally symmetric rank one manifolds of infinite volume

Abstract

We discuss questions by Mostow Mo1, Bers B and Krushkal Kr1, Kr2 about uniqueness of a conformal or spherical CR structure on the sphere at infinity ∂ HFn of symmetric rank one space HFn over division algebra F=R\,,C\,,H\,,or\,\, O compatible with the action of a discrete group G⊂IsomHFn. Introducing a nilpotent Sierpi\'nski carpet with a positive Lebesgue measure in the nilpotent geometry in ∂ HFn\∞\ and its stretching, we construct a non-rigid discrete F-hyperbolic groups G⊂IsomHFn whose non-trivial deformations are induced by G-equivariant homeomorphisms of the space. Here we consider two situations: either the limit set (G) is the whole sphere at infinity ∂ HFn or restrictions of such non-trivial deformations to components of the discontinuity set (G)⊂ ∂ HFn are given by restrictions of F-hyperbolic isometries. In both cases the demonstrated non-rigidity is related to non-ergodic dynamics of the discrete group action on the limit set which could be the whole sphere at infinity.