The number of automorphic representations of GL2 with exceptional eigenvalues

Abstract

We obtain an upper bound for the dimension of the cuspidal automorphic forms for GL2 over a number field, whose archimedean local representations are not tempered. More precisely, we prove the following result. Let F be a number field and AF be the ring of adeles of F. Let OF be the ring of integers of F. Let XF,ex be the set of irreducible cuspidal automorphic representations π of GL2(AF) with the trivial central character such that for each archimedean place v of F, the local representation of π at v is an unramified principal series and is not tempered. For an ideal J of OF, let K0(J) be the subgroup of GL2(AF) corresponding to 0(J) ⊂ SL2(OF). Let r1 be the number of real embeddings of F and r2 be the number of conjugate pairs of complex embeddings of F. Using the Arthur-Selberg trace formula, we have equation* Σπ∈ XF,ex πK0(J) F [SL2(OF) : 0(J)]( (NF/Q(J)))2r1+3r2 as |NF/Q(J)| ∞. equation* From this result, we obtain the result on an upper bound for the number of Hecke-Maass cusp forms of weight 0 on 0(N) which do not satisfy the Selberg eigenvalue conjecture.