Realizations of the formal double Eisenstein space

Abstract

We introduce the formal double Eisenstein space Ek, which is a generalization of the formal double zeta space Dk of Gangl-Kaneko-Zagier, and prove analogues of the sum formula and parity result for formal double Eisenstein series. We show that Q-linear maps Ek→ A, for some Q-algebra A, can be constructed from formal Laurent series (with coefficients in A) that satisfy the Fay identity. As the prototypical example, we define the Kronecker realization K: Ek→ Q[[q]], which lifts Gangl-Kaneko-Zagier's Bernoulli realization B: Dk→ Q, and whose image consists of quasimodular forms for the full modular group. As an application to the theory of modular forms, we obtain a purely combinatorial proof of Ramanujan's differential equations for classical Eisenstein series.