Algebra Structures of Multiple Eisenstein Series in Positive Characteristic

Abstract

In [CCHT25], the authors introduced multiple Eisenstein series of arbitrary rank in positive characteristic and the q-shuffle algebra E associated with them. In the present paper, we establish a class of linear independence results for multiple Eisenstein series. We also prove that the q-shuffle algebra R of multiple zeta values embeds into the inverse limit of the spaces of multiple Eisenstein series with respect to the rank r, and that E is isomorphic to the tensor square of R. As an application, we show that E is an associative algebra, thereby verifying the conjecture proposed in [CCHT25]

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