On residual automorphic representations and period integrals for symplectic groups

Abstract

We construct new irreducible components in the discrete automorphic spectrum of symplectic groups. The construction lifts a cuspidal automorphic representation of GL2n with a linear period to an irreducible component of the residual spectrum of the rank k symplectic group Spk for any k 2n. We show that this residual representation admits a non-zero Spn× Spk-n-invariant linear form. This generalizes a construction of Ginzburg, Rallis and Soudry, the case k=2n, that arises in the descent method.

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