Reductions of triangulated categories and simple-minded collections

Abstract

Silting and Calabi-Yau reductions are important process in representation theory to construct new triangulated categories from given one, which are similar to Verdier quotient. In this paper, first we introduce a new reduction process of triangulated category, which is analogous to the silting (Calabi-Yau) reduction. For a triangulated category T with a pre-simple-minded collection (=pre-SMC) R, we construct a new triangulated category U such that the SMCs in U bijectively correspond to those in T containing R. Secondly, we give an analogue of Buchweitz's theorem for the singularity category T sg of a SMC quadruple ( T, T p, S, S): the category T sg can be realized as the stable category of an extriangulated subcategory F of T. Finally, we show the SMS (simple-minded system) reduction due to Coelho Sim\~oes and Pauksztello is the shadow of our SMC reduction. This is parallel to the result that Calabi-Yau reduction is the shadow of silting reduction due to Iyama and Yang.