$L$-function for $\mathrm{Sp}(4)\times\mathrm{GL}(2)$ via a non-unique model

TL;DR

This paper proves a conjecture on an integral representation of an automorphic L-function for Sp(4) and GL(2), using a non-unique model and the New Way method, with applications to pole analysis and holomorphy.

Contribution

It establishes the conjectured integral representation for the L-function via a non-unique model and analyzes its properties using advanced methods, extending the understanding of automorphic L-functions.

Findings

Connected poles of L-function to non-vanishing period integrals

Proved holomorphy of L-function for certain cuspidal representations

Applied the New Way method to analyze the integral representation

Abstract

In this paper we prove a conjecture of Ginzburg and Soudry on an integral representation for the $L$-function $L^S(s, \pi\times \tau)$ attached to a pair $(\pi, \tau)$ of irreducible automorphic cuspidal representations of $\mathrm{Sp}_4({\mathbb A})$ and $\mathrm{GL}_2({\mathbb A})$, which is derived from the generalized doubling method of Cai, Friedberg, Ginzburg and Kaplan. We show that the integral unfolds to a non-unique model and analyze it using the New Way method of Piatetski-Shapiro and Rallis. Two applications are given. First, we relate the existence of the poles of $L^S(s,\pi\times\tau)$ to the non-vanishing of certain period integrals. Second, for certain family of cuspidal representations, we prove that $L^S(s, \pi\times \tau)$ is holomorphic.