On Representation of Integers from Thin Subgroups of SL(2,Z) with Parabolics

Abstract

Let <SL(2,Z) be a finitely generated, non-elementary Fuchsian group of the second kind, and v, w be two primitive vectors in Z2-(0,0). We consider the set S=\ vγ,wR2:γ∈\, where ·,·R2 is the standard inner product in R2. Using Hardy-Littlewood circle method and some infinite co-volume lattice point counting techniques developed by Bourgain, Kontorovich and Sarnak, together with Gamburd's 5/6 spectral gap, we show that if has parabolic elements, and the critical exponent δ of exceeds 0.995371, then a density-one subset of all admissible integers (i.e. integers passing all local obstructions) are actually in S, with a power savings on the size of the exceptional set (i.e. the set of admissible integers failing to appear in S). This supplements a result of Bourgain-Kontorovich, which proves a density-one statement for the case when is free, finitely generated, has no parabolics and has critical exponent δ>0.999950.