The congruence subgroup property for $S$-arithmetic subgroups of simple algebraic groups when $S$ has positive Dirichlet density
Andrei S. Rapinchuk
Abstract
Let $G$ be an absolutely almost simple simply connected algebraic group defined over a number field $K$, and let $M/K$ be the minimal Galois extension over which $G$ becomes an inner form of a split group. Assume that $G$ satisfies the Margulis-Platonov conjecture over $K$. We prove that if $S$ is a set of valuations of $K$ that contains all archimedean ones but does not contain any nonarchimedean valuations $v$ for which $G$ is anisotropic over the completion $K_v$ such that its intersection $S \cap \mathrm{Spl}(M/K)$ with the set $\mathrm{Spl}(M/K)$ of nonarchimedean valuations of $K$ that split completely in $M$ has positive Dirichlet density, then the congruence kernel $C^S(G)$ is trivial. This result provides additional evidence for Serre's Congruence Subgroup Conjecture. The proof does not involve any case-by-case considerations and relies on previous results concerning the congruence kernel and recent results on almost strong approximation.