Scattering diagrams from asymptotic analysis on Maurer-Cartan equations

Abstract

Let X0 be a semi-flat Calabi-Yau manifold equipped with a Lagrangian torus fibration p:X0 → B0. We investigate the asymptotic behavior of Maurer-Cartan solutions of the Kodaira-Spencer deformation theory on X0 by expanding them into Fourier series along fibres of p over a contractible open subset U⊂ B0, following a program set forth by Fukaya in 2005. We prove that semi-classical limits (i.e. leading order terms in asymptotic expansions) of the Fourier modes of a specific class of Maurer-Cartan solutions naturally give rise to consistent scattering diagrams, which are tropical combinatorial objects that have played a crucial role in works of Kontsevich-Soibelman and Gross-Siebert on the reconstruction problem in mirror symmetry.