Lifting Subgroups of Symplectic Groups over Z / Z

Abstract

For a positive integer g, let Sp2g(R) denote the group of 2g × 2g symplectic matrices over a ring R. Assume g 2. For a prime number , we give a self-contained proof that any closed subgroup of Sp2g(Z) which surjects onto Sp2g(Z/) must in fact equal all of Sp2g(Z). The result and the method of proof are both motivated by group-theoretic considerations that arise in the study of Galois representations associated to abelian varieties.