Triangulated Categories Admitting Linear Generators
Abstract
The main result of this paper is that there is an additive equivalence between Cn, the Paquette-Yildirim completion of the discrete cluster categories of Dynkin type A∞, and the perfect derived category of a certain DG algebra. This additive equivalence preserves some of the triangulated structure: it commutes with the suspension functor and preserves triangles with at least two indecomposable terms. In the process, we introduce the notion of a linear generator G in a Krull-Schmidt, Hom-finite triangulated category. It turns out that the existence of a linear generator affords a large amount of control over T. For example, it allows us to describe all indecomposable objects in T in terms of G, to determine all triangles of T with at least two indecomposable objects, and to show that the Rouquier dimension of T is at most one. Moreover, we prove that there is an additive equivalence (which preserves some of the triangulated structure) between T and the perfect derived category of a certain DG algebra. Finally, we show that any triangulated category with a linear generator is additively equivalent to a thick subcategory of Cn.
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