English

Estimates of Picard modular cusp forms

Number Theory 2023-02-10 v2

Abstract

In this article, for n2n\geq 2, we compute asymptotic, qualitative, and quantitative estimates of the Bergman kernel of Picard modular cusp forms associated to torsion-free, cocompact subgroups of SU((n,1),C)\mathrm{SU}\big((n,1),\mathbb{C}\big). The main result of the article is the following result. Let ΓSU((2,1),OK)\Gamma\subset \mathrm{SU}\big((2,1),\mathcal{O}_{K}\big) be a torsion-free subgroup of finite index, where KK is a totally imaginary field. Let BΓk\mathcal{B}_{\Gamma}^{k} denote the Bergman kernel associated to the Sk(Γ)\mathcal{S}_{k}(\Gamma), complex vector space of weight-kk cusp forms with respect to Γ\Gamma. Let B2\mathbb{B}^{2} denote the 22-dimensional complex ball endowed with the hyperbolic metric, and let XΓ:=Γ\B2X_{\Gamma}:=\Gamma\backslash \mathbb{B}^{2} denote the quotient space, which is a noncompact complex manifold of dimension 22. Let pet\big|\cdot\big|_{\mathrm{pet}} denote the point-wise Petersson norm on Sk(Γ)\mathcal{S}_{k}(\Gamma). Then, for k6k\geq 6, we have the following estimate \begin{equation*} \sup_{z\in X_{\Gamma}}\big|\mathcal{B}_{\Gamma}^{k}(z)\big|_{\mathrm{pet}}=O_{\Gamma}\big(k^{\frac{5}{2}}\big), \end{equation*} where the implied constant depends only on Γ\Gamma.

Keywords

Cite

@article{arxiv.2301.11160,
  title  = {Estimates of Picard modular cusp forms},
  author = {Anilatmaja Aryasomayajula and Bakar Balasubramanyam and Dyuti Roy},
  journal= {arXiv preprint arXiv:2301.11160},
  year   = {2023}
}

Comments

This is the first draft, and any comments, suggestions, and remarks are most welcome

R2 v1 2026-06-28T08:21:38.884Z