On Almost Strong Approximation in Reductive Algebraic Groups

Abstract: We investigate a slight weakening of the classical property of strong approximation, which we call almost strong approximation, for connected reductive algebraic group over global fields with respect to special sets of valuations. While nonsimply connected groups (in particular, all algebraic tori) always fail to have strong approximation - and even almost strong approximation -- with respect to any finite set of valuations, we show that under appropriate assumptions they do have almost strong approximation with respect to (infinite) tractable sets of valuations, i.e. those sets that contain all archimedean valuations and a generalized arithmetic progression minus a set having Dirichlet density zero. Almost strong approximation is likely to have a variety of applications, and as an example we use almost strong approximation for tori to extend the essential part of the result of Radhika and Raghunathan on the congruence subgroup problem for inner forms of type $\textsf{A}_n$ to all absolutely almost simple simply connected groups.