Construction of Maurer-Cartan elements over configuration spaces of curves

Abstract

For C a complex curve and n ≥ 1, a pair (P,∇P) of a principal bundle P with meromorphic flat connection over Cn, holomorphic over the configuration space Cn(C) of n points over C, was introduced in arXiv:1112.0864. For any point ∞ ∈ C, we construct a trivialisation of the restriction of P to (C∞)n and obtain a Maurer-Cartan element J over Cn(C∞) out of ∇P, thus generalising a construction of Levin and Racinet when the genus of C is higher than one. We give explicit formulas for J as well as for ∇P. When n=1, this construction gives rise to elements of Hain's space of second kind iterated integrals over C.

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