On compactly generated torsion pairs and the classification of co-\(t\)-structures for commutative noetherian rings (Q2790732)

The authors classify compactly generated co-t-structures on the derived category of a commutative Noetherian ring. In order to accomplish this, they develop a theory for compactly generated Hom-orthogonal pairs (also known as torsion pairs in the literature) in triangulated categories that resembles Bousfield localization theory. Finally, they show that the category of perfect complexes over a connected commutative Noetherian ring admits only the trivial co-t-structures and (de)suspensions of the canonical co-t-structure and use this to describe all silting objects in the category.NEWLINENEWLINEThe main sections of this paper are as follows: 1. Approximations and cotorsion pairs. In this section, the authors recall necessary results from the approximation theory and the theory of cotorsion pairs for exact categories with transfinite compositions of inflations; this is later used for proving the generalization of the recollement situation. In Section 2, the hierarchy of triangulated categories, they discuss technical conditions on triangulated categories. In the first part they prove some basic results on stable derivators which they have not been able to find in the literature. They show that the diagrams of global bicartesian squares are homotopy cartesian and establish a weak exactness of countable homotopy colimits in the spirit of \textit{B. Keller} and \textit{P. Nicolás} [Int. Math. Res. Not. 2013, No. 5, 1028--1078 (2013; Zbl 1312.18007)]. In the second part they provide some details on models for compactly generated algebraic triangulated categories which they need in the sequel. In Section 3, compactly generated Hom-orthogonal pairs, the authors prove the above mentioned generalizations of (i) and (ii) for compactly generated Hom-orthogonal pairs. In Section 4, classifying compactly generated t-structures and co-t-structures, they obtain the classification of compactly generated co-t-structures on the derived category of a commutative Noetherian ring, and in Section 5. Perfect co-t-structures in the commutative Noetherian case, they determine which of these restrict to co-t-structures on the category of perfect complexes.