The Mixed Hodge Structure on the Fundamental Group of a Punctured Riemann Surface

Abstract

Given a compact Riemann surface X of genus g and a point q on X, we consider X:=X\q\ with a basepoint p∈ X. The extension of mixed Hodge structures, given by the weights -1 and -2, of the mixed Hodge structure on the fundamental group (in the sense of Hain) is studied. We show that it naturally corresponds on the one hand to the element (2g q-2 p-K) in 0(X), where K represents the canonical divisor, and on the other hand to the respective extension of X. Finally, we prove a pointed Torelli theorem for punctured Riemann surfaces.

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