L∞-norm bounds for Siegel--Jacobi cusp forms

Abstract

In this article, we establish explicit and uniform L∞-norm bounds for L2-normalized Siegel--Jacobi cusp forms of integral weight k and index m for the Siegel modular group Γ0=Sp2g(Z) for arbitrary genus g≥ 1. Using the generalization of the classical Eichler--Zagier theta decomposition to higher genus, any such Siegel--Jacobi cusp form can be written as a finite linear combination of Siegel cusp forms of half-integral weight k-1/2 multiplied by the higher-dimensional analogues of the classical Jacobi theta functions. By building upon the uniform L∞ -norm bounds on average for Siegel cusp forms established by J.~Kramer and A.~Mandal~k1 via the associated Bergman kernels, we prove that for k∈Z≥ g+1, m∈Z≥ 1, and a given ε>0, the L∞-norm bound equation* ϕL∞=(τ,z)∈Hg×Cgϕ(τ,z)Pet=O Γ0,ε(k(3g2+5g)/8\,mg2+5g/4+ε) equation* holds for any Siegel--Jacobi cusp form ϕ that is L2-normalized with respect to the Petersson inner product. These estimates provide the first explicit upper bounds in terms of both parameters k and m for arbitrary genus g.

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