A construction of hyperk\"ahler metrics through Riemann-Hilbert problems I

Abstract

In 2009 Gaiotto, Moore and Neitzke presented a new construction of hyperk\"ahler metrics on the total spaces of certain complex integrable systems, represented as a torus fibration M over a base space B, except for a divisor D in B, in which the torus fiber degenerates into a nodal torus. The hyperk\"ahler metric g is obtained via solutions Xγ of a Riemann-Hilbert problem. We interpret the Kontsevich-Soibelman Wall Crossing Formula as an isomonodromic deformation of a family of RH problems, therefore guaranteeing continuity of Xγ at the walls of marginal stability. The technical details about solving the different classes of Riemann-Hilbert problems that arise here are left to a second article. To extend this construction to singular fibers, we use the Ooguri-Vafa case as our model and choose a suitable gauge transformation that allow us to define an integral equation defined at the degenerate fiber, whose solutions are the desired Darboux coordinates Xγ. We show that these functions yield a holomorphic symplectic form (ζ), which, by Hitchin's twistor construction, constructs the desired hyperk\"ahler metric.