Monodromy and irreducibility of type A1 automorphic Galois representations

Abstract

Let K be a totally real field and π be a regular algebraic polarized cuspidal automorphic representation of GLn( AK). Let \π,λ:GalKn( Eλ)\λ be the compatible system of Galois representations attached to π and denote by Gλ the algebraic monodromy group of π,λ. Suppose there exists λ0 such that (a) π,λ0 is irreducible; (b) Gλ0 is connected and of type A1; and (c) the tautological representation of Gλ0 is of a certain type. We prove that Gλ, C⊂GLn, C is independent of λ; π,λ is irreducible for all λ, and residually irreducible for almost all λ. Moreover, if K= Q or n is odd, we prove that the same conclusions hold without the assumption that π is polarized. We also prove that if K= Q, then the compatible system \π,λ\λ is constructed from certain two-dimensional modular compatible systems up to twist.

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