Fukaya categories of orbifold surfaces in representation theory

Abstract

We give an introduction to partially wrapped Fukaya categories of surfaces with orbifold singularities. Dissecting an orbifold surface S into polygons, certain dissections give rise to formal generators, inducing a triangulated equivalence between the derived Fukaya category of S and the perfect derived category of a graded associative algebra. This provides a geometric means for obtaining associative algebras -- conjecturally all -- which are derived equivalent to skew-gentle algebras. We include a new perspective on the partially wrapped Fukaya category of an orbifold disk which serves as a local model for the Fukaya categories of general orbifold surfaces. This perspective yields an equivalence between the perfect derived category of a quiver of type Dn+1 and the perfect derived category of a graded quiver of type An-1, the latter being equipped with quadratic zero relations and a nontrivial A∞ structure. This equivalence elucidates the relationship between skew-gentle algebras and orbifold surfaces, and the role of deformation theory in this relationship.