On the rationality of algebraic monodromy groups of compatible systems

Abstract

Let E be a number field and X a smooth geometrically connected variety defined over a characteristic p finite field. Given an n-dimensional pure E-compatible system of semisimple λ-adic representations of the \'etale fundamental group of X with connected algebraic monodromy groups Gλ, we construct a common E-form G of all the groups Gλ and in the absolutely irreducible case, a common E-form Gn,E of all the tautological representations Gλn,Eλ (Theorem 1.1). Analogous rationality results in characteristic p assuming the existence of crystalline companions in F-Isoc(X) Ev for all v|p (Theorem 1.5) and in characteristic zero assuming ordinariness (Theorem 1.6) are also obtained. Applications include a construction of G-compatible system from some GLn-compatible system and some results predicted by the Mumford-Tate conjecture.