From objects finitely presented by a rigid object in a triangulated category to 2-term complexes

Abstract

For a rigid object M in an algebraic triangulated category T, a functor pr(M)[-1,0]( proj\, A) is constructed, which essentially takes an object to its `presentation', where pr(M) is the full subcategory of T of objects finitely presented by M, A is the endomorphism algebra of M and H[-1,0]( proj\, A) is the homotopy category of complexes of finitely projective A-modules concentrated in degrees -1 and 0. This functor is shown to be full and dense and its kernel is described. It detects isomorphisms, indecomposability and extriangles. In the Hom-finite case, it induces a bijection from the set of isomorphism classes of basic relative cluster-tilting objects of pr(M) to that of basic silting complexs of H[-1,0]( proj\, A), which commutes with mutations. These results are applied to cluster categories of self-injective quivers with potential to recover a theorem of Mizuno on the endomorphism algebras of certain 2-term silting complexes. As an interesting consequence of the main results, if T is a 2-Calabi--Yau triangulated category and M is a cluster-tilting object such that A is self-injective, then P is an equivalence, in particular, H[-1,0]( proj\, A) admits a triangle structure. In the appendix by Iyama it is shown that for a finite-dimensional algebra A, if H[-1,0]( proj\, A) admits a triangle structure, then A is necessarily self-injective.