Almost split morphisms in subcategories of triangulated categories

Abstract

For a suitable triangulated category T with a Serre functor S and a full precovering subcategory C closed under summands and extensions, an indecomposable object C in C is called Ext-projective if Ext1(C,C)=0. Then there is no Auslander-Reiten triangle in C with end term C. In this paper, we show that if, for such an object C, there is a minimal right almost split morphism β:B→ C in C, then C appears in something very similar to an Auslander-Reiten triangle in C: an essentially unique triangle in T of the form align* = X Bβ C→ X, align* where X is an indecomposable not in C and is a C-envelope of X. Moreover, under some extra assumptions, we show that removing C from C and replacing it with X produces a new subcategory of T closed under extensions. We prove that this process coincides with the classic mutation of C with respect to the rigid subcategory of C generated by all the indecomposable Ext-projectives in C apart from C. When T is the cluster category of Dynkin type An and C has the above properties, we give a full description of the triangles in T of the form and show under which circumstances replacing C by X gives a new extension closed subcategory.