Whittaker periods, motivic periods, and special values of tensor product L-functions

TL;DR

This paper explores the relationship between Whittaker periods, motivic periods, and special values of tensor product L-functions for automorphic representations over imaginary quadratic fields, providing new insights into their algebraic and motivic nature.

Contribution

It establishes a motivic interpretation of Whittaker periods and relates them to critical L-values, extending the understanding of Deligne's conjecture for automorphic forms.

Findings

Whittaker periods can be interpreted motivically under certain conditions.

Critical values of Rankin-Selberg L-functions relate to Whittaker periods and motivic data.

Results align with Deligne's conjecture on special L-values.

Abstract

Let $\mathcal K$ be an imaginary quadratic field. Let $\Pi$ and $\Pi'$ be irreducible generic cohomological automorphic representation of $GL(n)/{\mathcal K}$ and $GL(n-1)/{\mathcal K}$, respectively. Each of them can be given two natural rational structures over number fields. One is defined by the rational structure on topological cohomology, the other is given in terms of the Whittaker model. The ratio between these rational structures is called a {\it Whittaker period}. An argument presented by Mahnkopf and Raghuram shows that, at least if $\Pi$ is cuspidal and the weights of $\Pi$ and $\Pi'$ are in a standard relative position, the critical values of the Rankin-Selberg product $L(s,\Pi \times \Pi')$ are essentially algebraic multiples of the product of the Whittaker periods of $\Pi$ and $\Pi'$. We show that, under certain regularity and polarization hypotheses, the Whittaker period of a cuspidal $\Pi$ can be given a motivic interpretation, and can also be related to a critical value of the adjoint $L$-function of related automorphic representations of unitary groups. The resulting expressions for critical values of the Rankin-Selberg and adjoint $L$-functions are compatible with Deligne's conjecture.