From weight structures to (orthogonal) t-structures and back

Abstract

A t-structure t=(Ct 0,Ct 0) on a triangulated category C is right adjacent to a weight structure w=(Cw 0, Cw 0) if Ct 0=Cw 0; then t can be uniquely recovered from w and vice versa. We prove that if C satisfies the Brown representability property then t that is adjacent to w exists if and only if w is smashing (i.e., coproducts respect weight decompositions); then the heart Ht is the category of those functors Hwop Ab that respect products. The dual to this statement is related to results of B. Keller and P. Nicolas. We also prove that an adjacent t exists whenever w is a bounded weight structure on a saturated R-linear category C (for a noetherian ring R); for C=Dperf(X), where the scheme X is regular and proper over R, this gives 1-to-1 correspondences between bounded weights structures on C and the classes of those bounded t-structures on it such that Ht has either enough projectives or injectives. We generalize this existence statement to construct (under certain assumptions) a t-structure t on a triangulated category C' such that C and C' are subcategories of a common triangulated category D and t is right orthogonal to w. In particular, if X is proper over R but not necessarily regular then one can take C=Dperf(X), C'=Dbcoh(X) or C'=D-coh(X), and D=Dqc(X). We also study hearts of orthogonal t-structures and their restrictions, and prove some statements on "reconstructing" weight structures from orthogonal t-structures. The main tool of this paper are virtual t-truncations of (cohomological) functors; these are defined in terms of weight structures and "behave as if they come from t-truncations" whether t exists or not.