Stable cohomology of universal character varieties

Abstract

We study the universal PGLn$character variety over Mg whose fiber over a point [C] is the space of PGLn-local systems on the curve C. We use nonabelian Hodge theory and properties of Saito's mixed Hodge modules to show that the Leray-Serre spectral sequence for the projection to Mg degenerates at E2. As an application, we prove that the rational cohomology of these varieties stabilizes as g goes to infinity and compute the stable limit. We also deduce similar results for the universal G-character variety over Mg,1 whose fiber over a punctured curve is the variety of G-local systems with fixed central monodromy around the puncture, for G = GLn or SLn.

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