English

Construction of Poincar\'e-type series by generating kernels

Number Theory 2020-02-24 v1

Abstract

Let ΓPSL2(R)\Gamma\subset \textrm{PSL}_2({\mathbb R}) be a Fuchsian group of the first kind having a fundamental domain with a finite hyperbolic area, and let Γ~\widetilde\Gamma be its cover in SL2(R)\textrm{SL}_2({\mathbb R}). Consider the space of twice continuously differentiable, square-integrable functions on the hyperbolic upper half-plane, which transform in a suitable way with respect to a multiplier system of weight kRk\in{\mathbb R} under the action of Γ~\widetilde\Gamma. The space of such functions admits the action of the hyperbolic Laplacian Δk\Delta_k of weight kk. Following an approach of Jorgenson, von Pippich and Smajlovi\'c (where k=0k=0), we use the spectral expansion associated to Δk\Delta_k to construct a wave distribution and then identify the conditions on its test functions under which it represents automorphic kernels and further gives rise to Poincar\'e-type series. An advantage of this method is that the resulting series may be naturally meromorphically continued to the whole complex plane. Additionally, we derive sup-norm bounds for the eigenfunctions in the discrete spectrum of Δk\Delta_k.

Keywords

Cite

@article{arxiv.2002.09061,
  title  = {Construction of Poincar\'e-type series by generating kernels},
  author = {Yasemin Kara and Moni Kumari and Jolanta Marzec and Kathrin Maurischat and Andreea Mocanu and Lejla Smajlović},
  journal= {arXiv preprint arXiv:2002.09061},
  year   = {2020}
}

Comments

Submitted to the Proceedings of the Women in Numbers Europe 3 Conference

R2 v1 2026-06-23T13:48:50.555Z