A Satake type theorem for Super Automorphic forms
Complex Variables
2009-09-08 v5 Group Theory
Abstract
Aim of this article is a Satake type theorem for super automorphic forms on a complex bounded symmetric super domain B of rank 1 with respect to a lattice. This theorem - roughly speaking - says that for large weight k and all p from 1 to infinity (both including) a super automorphic form on B is a super cusp form if and only if its p-norm with respect to a certain measure on the quotient of B is finite. And so in particular all these Lp-spaces coincide! We will give a proof of this theorem using an unbounded realization of B and Fourier decomposition at the cusps of the quotient mapped to infinity via a partial Cayley transform.
Cite
@article{arxiv.0806.4870,
title = {A Satake type theorem for Super Automorphic forms},
author = {Roland Knevel},
journal= {arXiv preprint arXiv:0806.4870},
year = {2009}
}
Comments
21 pages, 1 figure, minor changes in replacement