The abelian part of a compatible system and l-independence of the Tate conjecture

Abstract

Let K be a number field and Vl be a rational strictly compatible system of semisimple Galois representations of K arising from geometry. Let Gl and Vlab be respectively the algebraic monodromy group and the maximal abelian subrepresentation of Vl for all l. We prove that the system Vlab is also a rational strictly compatible system under some group theoretic conditions, e.g., when Gl' is connected and satisfies Hypothesis A for some prime l'. As an application, we prove that the Tate conjecture for abelian variety X/K is independent of l if the algebraic monodromy groups of the Galois representations of X satisfy the required conditions.