Airy structures and deformations of curves in surfaces

Abstract

An embedded curve in a symplectic surface ⊂ X defines a smooth deformation space B of nearby embedded curves. A key idea of Kontsevich and Soibelman arXiv:1701.09137 [math.AG], is to equip the symplectic surface X with a foliation in order to study the deformation space B. The foliation, together with a vector space V of meromorphic differentials on , endows an embedded curve with the structure of the initial data of topological recursion, which defines a collection of symmetric tensors on V. Kontsevich and Soibelman define an Airy structure on V to be a formal quadratic Lagrangian L⊂ T*(V*) which leads to an alternative construction of the tensors of topological recursion. In this paper we produce a formal series θ on B of meromorphic differentials on which takes it values in L, and use this to produce the Donagi-Markman cubic from a natural cubic tensor on V, giving a generalisation of a result of Baraglia and Huang, arXiv:1707.04975 [math.DG].