The role of gentle algebras in higher homological algebra

Abstract

Abstract We investigate the role of gentle algebras in higher homological algebra. In the first part of the paper, we show that if the module category of a gentle algebra Λ contains a d-cluster tilting subcategory for some d ≥ 2 {d\geq 2} , then Λ is a radical square zero Nakayama algebra. This gives a complete classification of weakly d-representation finite gentle algebras. In the second part, we use a geometric model of the derived category to prove a similar result in the triangulated setup. More precisely, we show that if 𝒟 b ⁡ ( Λ ) {\operatorname{\mathcal{D}}^{b}(\Lambda)} contains a d-cluster tilting subcategory that is closed under [ d ] {[d]} , then Λ is derived equivalent to an algebra of Dynkin type A. Furthermore, our approach gives a geometric characterization of all d-cluster tilting subcategories of 𝒟 b ⁡ ( Λ ) {\operatorname{\mathcal{D}}^{b}(\Lambda)} that are closed under [ d ] {[d]} .