Maximality of Galois actions for abelian and hyperkahler varieties

Abstract

Let \\ be the system of -adic representations arising from the ith -adic cohomology of a complete smooth variety X defined over a number field K. Let and G be respectively the image and the algebraic monodromy group of . We prove that the reductive quotient of G is unramified over every degree 12 totally ramified extension of Q for all sufficiently large . We give a necessary and sufficient condition () on \\ such that for all sufficiently large , the subgroup is in some sense maximal compact in G(Q). This is used to deduce Galois maximality results for -adic representations arising from abelian varieties (for all i) and hyperk\"ahler varieties (i=2) defined over finitely generated fields over Q.