The Fourier-Jacobi expansion of the singular theta lift
Abstract
Recently, Funke and Hofmann constructed a singular theta lift of Borcherds type for the dual reductive pair U(1,1)× U(p,q), p,q≥ 1, the input functions of which are harmonic weak Maass forms of weight k= 2-p-q. In the present paper, we give an explicit evaluation of the Fourier-Jacobi expansion of the lift. For this purpose, we adapt a method introduced by Kudla in his paper 'Another product for a Borcherds form'. As an application, in the case U(p,1) we recover a new infinite product expansion associated to a Borcherds form, analogous to the case O(p,2) treated by Kudla.
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