Period relations for automorphic induction and applications, I

TL;DR

This paper establishes functorial relations between automorphic periods for certain automorphic representations induced from Hecke characters, refining critical value formulas for Rankin-Selberg L-functions and advancing the automorphic version of Deligne's conjecture.

Contribution

It proves functoriality of automorphic periods under cyclic automorphic induction and refines formulas for critical L-values, advancing the understanding of automorphic and motivic period relations.

Findings

Automorphic periods are functorial under cyclic automorphic induction.

Refined formulas for critical values of Rankin-Selberg L-functions.

Automorphic version of Deligne's conjecture is completed in certain cases.

Abstract

Let $K$ be a quadratic imaginary field. Let $\Pi$ (resp. $\Pi'$) be a regular algebraic cuspidal representation of $GL_{n}(K)$ (resp. $GL_{n-1}(K)$) which is moreover cohomological and conjugate self-dual. In \cite{harris97}, M. Harris has defined automorphic periods of such a representation. These periods are automorphic analogues of motivic periods. In this paper, we show that automorphic periods are functorial in the case where $\Pi$ is a cyclic automorphic induction of a Hecke character $\chi$ over a CM field. More precisely, we prove relations between automorphic periods of $\Pi$ and those of $\chi$. As a corollary, we refine the formula given by H. Grobner and M. Harris of critical values for the Rankin-Selberg $L$-function $L(s,\Pi\times \Pi')$ in terms of automorphic periods. This completes the proof of an automorphic version of Deligne's conjecture in certain cases.