Multiplier systems for Hermitian modular groups
Abstract
Let be the Hermitian modular group of degree in sense of Hel Braun with respect to an imaginary quadratic field . Let be a natural number. There exists a multiplier system of weight (equivalently a Hermitian modular form of weight , integral) on some congruence group if and only if or . This follows from a much more general construction of Deligne [De] combining it with results of Hill [Hi], Prasad [P] and Prasad-Rapinchuk [PR]. As far as we know, the systems of weight have not yet been described explicitly. Remarkably Haowu Wang [Wa] gave an example of a modular form of half integral weight. Actually he constructs a Borcherds product of weight for a group of type . This group is isogenous to the group that contains the Hermitian modular groups of degree two. In this paper we want to study such multiplier systems. If one restricts them to the unimodular group one obtains a usual character. Our main result states that the kernel of this character is a non-congruence subgroup. For sufficiently small it coincides with the group described by Kubota in the case and by Bass Milnor Serre in the case .
Cite
@article{arxiv.2011.01534,
title = {Multiplier systems for Hermitian modular groups},
author = {Eberhard Freitag},
journal= {arXiv preprint arXiv:2011.01534},
year = {2020}
}
Comments
arXiv admin note: text overlap with arXiv:2009.06455