A specialisation of the Bump-Friedberg L-function

Abstract

We study the restriction of the Bump-Friedberg integrals to affine lines \(s+α,2s),s∈\. It has a simple theory, very close to that of the Asai L-function. It is an integral representation of the product L(s+α,π)L(2s,2,π) which we denote by Llin(s,π,α) for this abstract, when π is a cuspidal automorphic representation of GL(k,A) for A the adeles of a number field. When k is even, we show that for a cuspidal automorphic representation π, the partial L-function Llin,S(s,π,α) has a pole at 1/2, if and only if π admits a (twisted) global period, this gives a more direct proof of a theorem of Jacquet and Friedberg, asserting that π has a twisted global period if and only if L(α+1/2,π)≠ 0 and L(1,2,π)=∞. When k is odd, the partial L-function is holmorphic in a neighbourhood of Re(s)≥ 1/2 when Re(α) is ≥ 0.