Single-valued flat connections in several variables on arbitrary Riemann surfaces

Abstract

Polylogarithms on Riemann surfaces may be constructed efficiently in terms of flat connections that can enjoy various algebraic and analytic properties. In this paper, we present a single-valued and modular invariant connection JDHS on the configuration space Cfn() of an arbitrary number n of points on an arbitrary compact Riemann surface with or without punctures. The connection JDHS generalizes an earlier construction for a single variable and is built out of the same integration kernels. We show that JDHS is flat on Cfn(). For the case without punctures, we relate it to the meromorphic multiple-valued Enriquez connection KE in n variables on the universal cover of by the composition of a gauge transformation and an automorphism of the Lie algebra in which JDHS and KE take values. In a companion paper, we shall establish the equivalence between the flatness of these connections and the corresponding interchange and Fay identities, for arbitrary compact Riemann surfaces.