A converse theorem for Borcherds products on X0(N)

Abstract

We show that every Fricke invariant meromorphic modular form for 0(N) whose divisor on X0(N) is defined over Q and supported on Heegner divisors and the cusps is a generalized Borcherds product associated to a harmonic Maass form of weight 1/2. Further, we derive a criterion for the finiteness of the multiplier systems of generalized Borcherds products in terms of the vanishing of the central derivatives of L-function of certain weight 2 newforms. We also prove similar results for twisted Borcherds products.