Tropical counting from asymptotic analysis on Maurer-Cartan equations

Abstract

Let X = X be a toric surface and (X, W) be its Landau-Ginzburg (LG) mirror where W is the Hori-Vafa potential. We apply asymptotic analysis to study the extended deformation theory of the LG model (X, W), and prove that semi-classical limits of Fourier modes of a specific class of Maurer-Cartan solutions naturally give rise to tropical disks in X with Maslov index 0 or 2, the latter of which produces a universal unfolding of W. For X = P2, our construction reproduces Gross' perturbed potential Wn which was proven to be the universal unfolding of W written in canonical coordinates. We also explain how the extended deformation theory can be used to reinterpret the jumping phenomenon of Wn across walls of the scattering diagram formed by the Maslov index 0 tropical disks originally observed by Gross (in the case of X = P2).