Inducing Super-Approximation

Abstract

Let 2⊂eq 1 be finitely generated subgroups of GLn0(Z[1/q0]). For i=1 or 2, let Gi be the Zariski-closure of i in ( GLn0)Q, Gi be the Zariski-connected component of Gi, and let Gi be the closure of i in Πp q0 GLn0(Zp). In this article we prove that, if G1 is the smallest closed normal subgroup of G1 which contains G2 and 2 G2 has spectral gap, then 1 G1 has spectral gap.