Graded decorated marked surfaces: Calabi-Yau-X categories of gentle algebras

Abstract

Let S be a graded marked surface. We construct a string model for Calabi-Yau-X category DX(S), via the graded DMS (=decorated marked surface) S. We prove an isomorphism between the braid twist group of S and the spherical twist group of DX(S), and q-intersection formulas. We also give a topological realization of the Lagrangian immersion D∞(S)X(S), where D∞(S) is the topological Fukaya category associated to S, that is triangle equivalent to the bounded derived category of some graded gentle algebra. This generalizes previous works of [Qiu, Qiu-Zhou] in the Calabi-Yau-3 case and and also unifies the Calabi-Yau-∞ case D∞(S) (cf. [Haiden-Katzarkov-Kontsevich, Opper-Plamondon-Schroll]).