On t-structures adjacent and orthogonal to weight structures

Abstract

We study t-structures (on triangulated categories) that are closely related to weight structures. A t-structure couple t=(Ct 0,Ct 0) is said to be adjacent to a weight structure w=(Cw 0, Cw 0) if Ct 0=Cw 0. For a category C that satisfies the Brown representability property we prove that t that is adjacent to w exists if and only if w is smashing (that is, "respects C-coproducts"). The heart Ht of this t is the category of those functors Hwop Ab that respect products (here Hw is the heart of w); the result has important applications. We prove several more statements on constructing t-structures starting from weight structures; we look for a strictly orthogonal t-structure t on some C' (where C,C' are triangulated subcategories of a common D) such that C't 0 (resp. C't 0) is characterized by the vanishing of morphisms from Cw 1 (resp. Cw -1). Some of these results generalize properties of semi-orthogonal decompositions proved in the previous paper, and can be applied to various derived categories of (quasi)coherent sheaves on a scheme X that is projective over an affine noetherian one. We also study hearts of orthogonal t-structures and their restrictions, and prove some statements on "reconstructing" weight structures from orthogonal t-structures.