Analogues of hyperlogarithm functions on affine complex curves
Abstract
For C a smooth affine complex curve, there is a unique minimal subalgebra AC of the algebra Ohol( C) of holomorphic functions on its universal cover C, which is stable under all the operations f ∫ fω, for ω in the space (C) of regular differentials on C. We identify AC with the image of the iterated integration map Ix0 : Sh((C)) Ohol( C) based at any point x0 of C (here Sh(-) denotes the shuffle algebra of a vector space), as well as with the unipotent part, with respect to the action of Aut( C/C), of a subalgebra of Ohol( C) of moderate growth functions. We show that any regular Maurer-Cartan (MC) element J on C with values in the topologically free Lie algebra over H1dR(C)* gives rise to an isomorphism of AC with O(C) ( H1dR(C)), where O(C) is the algebra of regular functions on C, leading to the assignment of a subalgebra HC(J) of AC (isomorphic to Sh( H1dR(C))) to any MC element. We also associate a MC element Jσ to each section σ of the projection (C) H1dR(C); when C has genus 0, we exhibit a particular section σ0 for which HC(Jσ0) is the algebra of hyperlogarithm functions (Poincar\'e, Lappo-Danilevsky).
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