On the Enlargement by Pr\"ufer Objects of the Cluster Category of type A∞

Abstract

In a paper by Holm and Jorgensen, the cluster category D of type A∞, with Auslander-Reiten quiver Z A∞, is introduced. Slices in the Auslander-Reiten quiver of D give rise to direct systems; the homotopy colimit of such direct systems can be computed and these "Pr\"ufer objects" can be adjoined to form a larger category. It is this larger category, D, which is the main object of study in this paper. We show that D inherits a nice geometrical structure from D; "arcs" between non-neighbouring integers on the number line correspond to indecomposable objects, and in the case of D we also have arcs to infinity which correspond to the Pr\"ufer objects. During the course of this paper, we show that D is triangulated, compute homs, investigate the geometric model, and we conclude by computing the cluster tilting subcategories of D.