An Identity relating Eisenstein series on general linear groups
Number Theory
2022-12-02 v1 Representation Theory
Abstract
We give a general identity relating Eisenstein series on general linear groups. We do it by constructing an Eisenstein series, attached to a maximal parabolic subgroup and a pair of representations, one cuspidal and the other a character, and express it in terms of a degenerate Eisenstein series. In the local fields analogue, we prove the convergence in a half plane of the local integrals, and their meromorphic continuation. In addition, we find that the unramified calculation gives the Godement-Jacquet zeta function. This realizes and generalizes the construction proposed by Ginzburg and Soudry in Section 3 in their aritcle "Integral derived from the doubling method".
Cite
@article{arxiv.2212.00077,
title = {An Identity relating Eisenstein series on general linear groups},
author = {Zahi Hazan},
journal= {arXiv preprint arXiv:2212.00077},
year = {2022}
}
Comments
38 pages