Scalar-valued depth two Eichler-Shimura Integrals of Cusp Forms

Abstract

Given cusp forms f and g of integral weight k ≥ 2, the depth two holomorphic iterated Eichler-Shimura integral If,g is defined by ∫τi∞f(z)(X-z)k-2Ig(z;Y)dz, where Ig is the Eichler integral of g and X,Y are formal variables. We provide an explicit vector-valued modular form whose top components are given by If,g. We show that this vector-valued modular form gives rise to a scalar-valued iterated Eichler integral of depth two, denoted by Ef,g, that can be seen as a higher-depth generalization of the scalar-valued Eichler integral Ef of depth one. As an aside, our argument provides an alternative explanation of an orthogonality relation satisfied by period polynomials originally due to Pasol-Popa. We show that Ef,g can be expressed in terms of sums of products of components of vector-valued Eisenstein series with classical modular forms after multiplication with a suitable power of the discriminant modular form . This allows for effective computation of Ef,g.