Torus counting and self-joinings of Kleinian groups

Abstract

For any d≥ 1, we obtain counting and equidistribution results for tori with small volume for a class of d-dimensional torus packings, invariant under a self-joining <Πi=1dPSL2(C) of a Kleinian group formed by a d-tuple of convex cocompact representations =(1, ·s, d). More precisely, if P is a -admissible d-dimensional torus packing, then for any bounded subset E⊂ Cd with ∂ E contained in a proper real algebraic subvariety, we have s 0 sδL1() · \#\T∈ P: Vol (T)> s,\, T E≠ \= c P· ω (E ). Here 0<δL1() 2/ d is the critical exponent of with respect to the L1-metric on the product Πi=1d H3, ⊂ (C\∞\)d is the limit set of , and ω is a locally finite Borel measure on Cd which can be explicitly described. The class of admissible torus packings we consider arises naturally from the Teichm\"uller theory of Kleinian groups. Our work extends previous results of Oh-Shah on circle packings (i.e. one-dimensional torus packings) to d-torus packings.