Hyperk\"ahler metrics on the moduli space of weakly parabolic Higgs bundles

Abstract

We use the theory of Gaiotto, Moore and Neitzke to construct a set of Darboux coordinates on the moduli space M of weakly parabolic SL(2,C)-Higgs bundles. For generic Higgs bundles (E,R) with R 0 the coordinates are shown to be dominated by a leading term that is given by the coordinates for a corresponding simpler space of limiting configurations and we prove that the deviation from the limiting term is given by a remainder that is exponentially suppressed in R. We then use this result to solve an associated Riemann-Hilbert problem and construct a twistorial hyperk\"ahler metric gtwist on M. Comparing this metric to the simpler semiflat metric gsf, we show that their difference is gtwist-gsf=O(e-μ R), where μ is a minimal period of the determinant of the Higgs field.

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