On compatibility of the -adic realisations of an abelian motive

Abstract

In this article we introduce the notion of a quasi-compatible system of Galois representations. The quasi-compatibility condition is a slight relaxation of the classical compatibility condition in the sense of Serre. The main theorem that we prove is the following: Let M be an abelian motive, in the sense of Yves Andr\'e. Then the -adic realisations of M form a quasi-compatible system of Galois representations. (In fact, we actually prove something stronger. See theorem 5.1.) As an application, we deduce that the absolute rank of the -adic monodromy groups of M does not depend on . In particular, the Mumford-Tate conjecture for M does not depend on .