Towards generalized prehomogeneous zeta integrals
Abstract
Let be a prehomogeneous vector space under a connected reductive group over . Assume that the open -orbit admits a finite covering by a symmetric space. We study certain zeta integrals involving (i) Schwartz functions on , and (ii) generalized matrix coefficients on of Casselman-Wallach representations of , upon a twist by complex powers of relative invariants. This merges representation theory with prehomogeneous zeta integrals of Igusa et al. We show their convergence in some shifted cone, and prove their meromorphic continuation via the machinery of -function together with V. Ginzburg's results on admissible -modules. This provides some evidences for a broader theory of zeta integrals associated to affine spherical embeddings.
Cite
@article{arxiv.1610.05973,
title = {Towards generalized prehomogeneous zeta integrals},
author = {Wen-Wei Li},
journal= {arXiv preprint arXiv:1610.05973},
year = {2017}
}
Comments
23 pages. Minor revision