Classifying t-structures via ICE-closed subcategories and a lattice of torsion classes

Abstract

In a triangulated category equipped with a t-structure, we investigate a relation between ICE-closed (=Image-Cokernel-Extension-closed) subcategories of the heart of the t-structure and aisles in the triangulated categories. We introduce an ICE sequence, a sequence of ICE-closed subcategories satisfying a certain condition, and establish a bijection between ICE sequences and homology-determined preaisles. Moreover we give a sufficient condition that an ICE sequence induces a t-structure via the bijection. In the case of the bounded derived category Db(mod) of a τ-tilting finite algebra , we give a description of ICE sequences in mod which induce bounded t-structures on Db(mod) from the viewpoint of a lattice consisting of torsion classes in mod.