A generalization of formal multiple zeta values related to multiple Eisenstein series and multiple q-zeta values

Abstract

We present the τ-invariant balanced quasi-shuffle algebra Gf, whose elements formalize (combinatorial) multiple Eisenstein series as well as multiple q-zeta values. In particular, Gf has natural maps into these two algebras, and we expect these maps to be isomorphisms. Racinet studied the algebra Zf of formal multiple zeta values by examining the corresponding affine scheme DM. Similarly, we present the affine scheme BM corresponding to the algebra Gf. We show that Racinet's affine scheme DM embeds into our affine scheme BM. This leads to a projection from the algebra Gf onto Zf. Via the above natural maps, this projection corresponds to extracting the constant terms of multiple Eisenstein series or the limit q1 of multiple q-zeta values.