Bump-Friedberg type periods beyond the cuspidal spectrum

Abstract

In this article, we study several Bump--Friedberg type periods beyond the cuspidal spectrum. We first consider the twisted Bump--Friedberg period on GL2n, as well as a variant on GL1× GL2n. Under suitable regularity conditions on the cuspidal datum, these periods extend continuously to automorphic functions of uniform moderate growth. Such extensions are characterized by entire Whittaker-type zeta integrals. We then introduce a Bump--Friedberg type period on GL2n+1, integrating over the subgroup SLn+1× GLn. For certain Eisenstein series, we evaluate this period as a finite sum of products of special values of L-functions and normalized local zeta integrals. Assuming the expected global Langlands correspondence, the sum is indexed by the fixed points of the extended L-parameter on the conjectural dual variety, and the resulting L-factors agree with the tangent space prediction of the global numerical conjecture of Ben-Zvi-Sakellaridis-Venkatesh.

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