Monodromy of subrepresentations and irreducibility of low degree automorphic Galois representations

Abstract: Let $X$ be a smooth, separated, geometrically connected scheme defined over a number field $K$ and ${\rho_\lambda}\lambda$ a system of n-dimensional semisimple $\lambda$-adic representations of the \'etale fundamental group of $X$ such that for each closed point $x$ of $X$, the specialization ${\rho{\lambda,x}}\lambda$ is a compatible system of Galois representations under mild local conditions. For almost all $\lambda$, we prove that any type A irreducible subrepresentation of $\rho\lambda\otimes \bar{\mathbb{Q}}\ell$ is residually irreducible. When $K$ is totally real or CM, $n\leq 6$, and ${\rho\lambda}\lambda$ is the compatible system of Galois representations of $K$ attached to a regular algebraic, polarized, cuspidal automorphic representation of $\mathrm{GL}_n(\mathbb{A}_K)$, for almost all $\lambda$ we prove that $\rho\lambda\otimes\bar{\mathbb{Q}}_\ell$ is (i) irreducible and (ii) residually irreducible if in addition $K=\mathbb{Q}$.