A multivariate integral representation on GL2 × GSp4 inspired by the pullback formula

Abstract

We give a two variable Rankin-Selberg integral inspired by consideration of Garrett's pullback formula. For a globally generic cusp form on GL2× GSp4, the integral represents the product of the Std× Spin and 1 × Std L-functions. We prove a result concerning an Archimedean principal series representation in order to verify a case of Jiang's first-term identity relating certain non-Siegel Eisenstein series on symplectic groups. Using it, we obtain a new proof of a known result concerning possible poles of these L-functions.