Linear independence of indefinite iterated Eisenstein integrals
Abstract
We prove linear independence of indefinite iterated Eisenstein integrals over the fraction field of the ring of formal power series Z[[q]]. Our proof relies on a general criterium for linear independence of iterated integrals, which has been established by Deneufch\atel, Duchamp, Minh and Solomon. As a corollary, we obtain C-linear independence of indefinite iterated Eisenstein integrals, which has applications to the study of elliptic multiple zeta values, as defined by Enriquez.
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