English

Sup-norm bounds for Jacobi cusp forms

Number Theory 2025-02-03 v3

Abstract

In this article, we give LL^{\infty}-norm bounds for the natural invariant norm of cusp forms of real weight kk and character χ\chi for any cofinite Fuchsian subgroup ΓSL2(R)\Gamma\subset\mathrm{SL}_{2}(\mathbb{R}). Using the representation of Jacobi cusp forms of integral weight kk and index mm for the modular group Γ0=SL2(Z)\Gamma_{0}=\mathrm{SL}_{2}(\mathbb{Z}) as linear combinations of modular forms of weight k12k-\frac{1}{2} for some congruence subgroup of Γ0\Gamma_{0} (depending on mm) and suitable Jacobi theta functions, we derive LL^{\infty}-norm bounds for the natural invariant norm of these Jacobi cusp forms. More specifically, letting Jk,mcusp(Γ0)J_{k,m}^{\mathrm{cusp}}(\Gamma_{0}) denote the complex vector space of Jacobi cusp forms under consideration and Pet\Vert\cdot\Vert_{\mathrm{Pet}} the pointwise Petersson norm on Jk,mcusp(Γ0)J_{k,m}^{\mathrm{cusp}}(\Gamma_ {0}), we prove that for kZ5k\in\mathbb{Z}_{\ge 5} and mZ1m\in\mathbb{Z}_{\ge 1}, and a given ϵ>0\epsilon>0, the LL^{\infty}-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 ϕJk,mcusp(Γ0)\phi\in J_{k,m}^{\mathrm{cusp}}(\Gamma_{0}), which is L2L^{2}-normalized with respect to the Petersson inner product, where the implied constant depends on Γ0\Gamma_{0} and the choice of ϵ>0\epsilon>0.

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}
}
R2 v1 2026-06-28T16:01:10.521Z