Automorphic Schwarzian equations and integrals of weight 2 forms

Abstract

In this paper, we investigate the non-modular solutions to the Schwarz differential equation \f,τ \=sE4(τ) where E4(τ) is the weight 4 Eisenstein series and s is a complex parameter. In particular, we provide explicit solutions for each s=2π2(n/6)2 with n 1 12. These solutions are obtained as integrals of meromorphic weight 2 modular forms. As a consequence, we find explicit solutions to the differential equation y''+π2n236\,E4\,y=0 for each n 1 12 generalizing the work of Hurwitz and Klein on the case n=1. Our investigation relies on the theory of equivariant functions on the complex upper half-plane. This paper supplements a previous work where we determine all the parameters s for which the above Schwarzian equation has a modular solution.