Loop group methods for the non-abelian Hodge correspondence on a 4-punctured sphere
Abstract
The non-abelian Hodge correspondence is a real analytic map between the moduli space of stable Higgs bundles and the deRham moduli space of irreducible flat connections mediated by solutions to the self-duality equations. In this paper we construct self-duality solutions for strongly parabolic sl(2, C) Higgs fields on a 4-punctured sphere with parabolic weights t 0 using complex analytic methods. We identify the rescaled limit hyper-K\"ahler moduli space Mt at t=0 to be the completion of the nilpotent orbit in sl(2, C) modulo a Z2× Z2 action, equipped with the Eguchi-Hanson metric. Our methods and computations are based on the twistor approach to the self-duality equations using Deligne and Simpson's λ-connections interpretation. By construction we can compute the Taylor expansions of the holomorphic symplectic form t on Mt at t=0 which turn out to have closed form expressions in terms of multiple polylogarithms (MPLs). The geometric properties of Mt lead to some identities of certain MPLs which we believe deserve further investigations.
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