Resolving subcategories for gentle algebras III: Tilting modules for gentle tree algebras

Abstract

This paper is the third part of a series that intends to study the resolving subcategories for gentle algebras over an algebraically closed field K. As in the previous two papers, we continue to focus on gentle trees (Q,R). Via a modified surface model for gentle algebras with finite global dimension, we developed combinatorial, poset, and quiver representation techniques that allow one to calculate all the resolving subcategories of KQ/ R -mod. Furthermore, they enable one to calculate the resolving subcategory generated by any collection of KQ/ R -modules. In this paper, based on those techniques, we give a combinatorial realization of the Auslander--Reiten one-to-one correspondence between resolving subcategories and tilting modules in KQ/ R -mod.