Intermediate co-t-structures, two-term silting objects, tau-tilting modules, and torsion classes
arXiv:1311.4891 · doi:10.2140/ant.2014.8.2413
Abstract
If (A,B) and (A',B') are co-t-structures of a triangulated category, then (A',B') is called intermediate if A \subseteq A' \subseteq ΣA. Our main results show that intermediate co-t-structures are in bijection with two-term silting subcategories, and also with support tau-tilting subcategories under some assumptions. We also show that support tau-tilting subcategories are in bijection with certain finitely generated torsion classes. These generalise results by Adachi, Iyama, and Reiten.
To appear in Algebra and Number Theory. Final accepted version. 16 pages, minor revision of previous version