Adelic Maass spaces on U(2,2)
Number Theory
2007-06-20 v1 Representation Theory
Abstract
Generalizing the results of Kojima, Gritsenko and Krieg, we define an adelic version of the Maass space for hermitian modular forms of weight k regarded as functions on adelic points of the quasi-split unitary group U(2,2) associated with an imaginary quadratic extension F/Q of discriminant D_F. When the class number h_F of F is odd, we show that the Maass space is invariant under the action of the local Hecke algebras of U(2,2)(Q_p) for all p not dividing D_F. As a consequence we obtain a Hecke-equivariant injective map from the Maass space to the h_F-fold direct product of the space of elliptic modular forms of weight k-1 and level D_F.
Cite
@article{arxiv.0706.2828,
title = {Adelic Maass spaces on U(2,2)},
author = {Krzysztof Klosin},
journal= {arXiv preprint arXiv:0706.2828},
year = {2007}
}