Intermediate co-t-structures, two-term silting objects, tau-tilting modules, and torsion classes

Dong Yang; Osamu Iyama; Peter Jorgensen

arxiv: 1311.4891 · v2 · pith:L464AN67new · submitted 2013-11-19 · 🧮 math.RT

Intermediate co-t-structures, two-term silting objects, tau-tilting modules, and torsion classes

Osamu Iyama , Peter Jorgensen , Dong Yang This is my paper

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keywords co-t-structuresintermediatesubcategoriestau-tiltingbijectionclassesresultssilting

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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 \Sigma A. 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.

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Fishing for complements
math.RT 2024-02 unverdicted novelty 5.0

Necessary and sufficient conditions for complements to presilting objects in triangulated categories are established via co-t-structures, plus an equivalence characterizing silting-discrete algebras.