Hodge numbers of moduli of principal bundles on a curve

Abstract

We prove an inversion theorem for recursive formulas satisfied by certain families of converging power series in two variables. These power series are indexed by the Harder-Narasimhan types of principal G-bundles of degree d ∈ π1 G on a smooth projective curve X, where G is a connected complex reductive group. As an application, we obtain a closed formula for the Hodge-Poincaré series of moduli stacks of semistable principal G-bundles of degree d. We also compute the variation of Hodge structure of the moduli stack of all principal G-bundles over X, as a function of the period matrix of that curve.