Sup-norm bounds for Jacobi cusp forms
Abstract
In this article, we give -norm bounds for the natural invariant norm of cusp forms of real weight and character for any cofinite Fuchsian subgroup . Using the representation of Jacobi cusp forms of integral weight and index for the modular group as linear combinations of modular forms of weight for some congruence subgroup of (depending on ) and suitable Jacobi theta functions, we derive -norm bounds for the natural invariant norm of these Jacobi cusp forms. More specifically, letting denote the complex vector space of Jacobi cusp forms under consideration and the pointwise Petersson norm on , we prove that for and , and a given , the -norm bound \begin{align*} \Vert\phi\Vert_{L^{\infty}}=\sup_{(\tau,z)\in\mathbb{H}\times\mathbb{C}}\Vert\phi(\tau,z)\Vert_{\mathrm{Pet}}=O_{\Gamma_{0},\epsilon}\big(k\,m^{\frac {7}{4}+\epsilon}\big) \end{align*} holds for any , which is -normalized with respect to the Petersson inner product, where the implied constant depends on and the choice of .
Cite
@article{arxiv.2404.13625,
title = {Sup-norm bounds for Jacobi cusp forms},
author = {Anilatmaja Aryasomayajula and Jürg Kramer and Anna-Maria von Pippich},
journal= {arXiv preprint arXiv:2404.13625},
year = {2025}
}