English

Auslander-Buchweitz context and co-t-structures

Category Theory 2011-11-21 v3 Representation Theory

Abstract

We show that the relative Auslander-Buchweitz context on a triangulated category \T\T coincides with the notion of co-tt-structure on certain triangulated subcategory of \T\T (see Theorem \ref{M2}). In the Krull-Schmidt case, we stablish a bijective correspondence between co-tt-structures and cosuspended, precovering subcategories (see Theorem \ref{correspond}). We also give a characterization of bounded co-tt-structures in terms of relative homological algebra. The relationship between silting classes and co-tt-structures is also studied. We prove that a silting class ω\omega induces a bounded non-degenerated co-tt-structure on the smallest thick triangulated subcategory of \T\T containing ω.\omega. We also give a description of the bounded co-tt-structures on \T\T (see Theorem \ref{Msc}). Finally, as an application to the particular case of the bounded derived category \D(\HH),\D(\HH), where \HH\HH is an abelian hereditary category which is Hom-finite, Ext-finite and has a tilting object (see \cite{HR}), we give a bijective correspondence between finite silting generator sets ω=\add(ω)\omega=\add\,(\omega) and bounded co-tt-structures (see Theorem \ref{teoH}).

Keywords

Cite

@article{arxiv.1002.4604,
  title  = {Auslander-Buchweitz context and co-t-structures},
  author = {O. Mendoza and E. C. Saenz and V. Santiago and M. J. Souto Salorio},
  journal= {arXiv preprint arXiv:1002.4604},
  year   = {2011}
}

Comments

24 pages, to appear at: Appl. Categor. Struct

R2 v1 2026-06-21T14:50:48.389Z