Derived equivalences of gentle algebras via Fukaya categories

Abstract

Following the approach of Haiden-Katzarkov-Kontsevich arXiv:1409.8611, to any homologically smooth graded gentle algebra A we associate a triple (A, A; ηA), where A is an oriented smooth surface with non-empty boundary, A is a set of stops on ∂ A and ηA is a line field on A, such that the derived category of perfect dg-modules of A is equivalent to the partially wrapped Fukaya category of (A, A ;ηA). Modifying arguments of Johnson and Kawazumi, we classify the orbit decomposition of the action of the (symplectic) mapping class group of A on the homotopy classes of line fields. As a result we obtain a sufficient criterion for homologically smooth graded gentle algebras to be derived equivalent. Our criterion uses numerical invariants generalizing those given by Avella-Alaminos-Geiss in math/0607348, as well as some other numerical invariants. As an application, we find many new cases when the AAG-invariants determine the derived Morita class. As another application, we establish some derived equivalences between the stacky nodal curves considered in arXiv:1705.06023.