Towards resurgence of Joyce structures

Abstract

Given a Joyce structure, we show that the associated C*-family of non-linear connections Aε can be gauged to a standard form Aε,st by a gauge transformation g, formal in ε. We show that the corresponding infinitesimal gauge transformation g=(g) has a convergent Borel transform, provided g vanishes on the base of the Joyce structure. This establishes the first step in showing that such a g is resurgent. We also use g to produce formal twistor Darboux coordinates for the complex hyperk\"ahler structure associated to the Joyce structure, and show a similar result about convergence of the Borel transform of the formal twistor Darboux coordinates.