On C-Algebraic and C-Arithmetic Automorphic Representations

Abstract

In the first part of the article, we consider the conjecture of K. Buzzard and T. Gee proposing that every C-algebraic automorphic representation is C-arithmetic, and we show that it can be reduced to the the analogous statement for cuspidal C-algebraic automorphic representations. We also show that if every cuspidal C-algebraic automorphic representations is C-arithmetic, then every L-algebraic automorphic representation is L-arithmetic. In the second part, we restrict to the simpler setting of anisotropic groups. We prove a criterion which shows that, under certain conditions, the trace formula can be used to establish that an automorphic representation is C-arithmetic. This criterion does not require the existence of a geometric model for the non-Archimedean part of the representation: it only depends on the possibility of isolating a finite family of automorphic representations containing the given one, and on a certain arithmetic condition on the Archimedean orbital integrals. As an application, we give a new proof that regular discrete series are C-arithmetic.