Quantifying Residual Finiteness of Linear Groups

Abstract

Normal residual finiteness growth measures how well a finitely generated group is approximated by its finite quotients. We show that any linear group ≤ GLd(K) has normal residual finiteness growth asymptotically bounded above by (n n)d2-1; notably this bound depends only on the degree of linearity of . We also give precise asymptotics in the case that is a subgroup of a higher rank Chevalley group G and compute the non-normal residual finiteness growth in these cases. In particular, finite index subgroups of G(Z) and G(Fp[t]) have normal residual finiteness growth n(G).