English

Realisation functors in tilting theory

Representation Theory 2017-07-26 v3 Algebraic Geometry Category Theory

Abstract

Derived equivalences and t-structures are closely related. We use realisation functors associated to t-structures in triangulated categories to establish a derived Morita theory for abelian categories with a projective generator or an injective cogenerator. For this purpose we develop a theory of (noncompact, or large) tilting and cotilting objects that generalises the preceding notions in the literature. Within the scope of derived Morita theory for rings we show that, under some assumptions, the realisation functor is a derived tensor product. This fact allows us to approach a problem by Rickard on the shape of derived equivalences. Finally, we apply the techniques of this new derived Morita theory to show that a recollement of derived categories is a derived version of a recollement of abelian categories if and only if there are tilting or cotilting t-structures glueing to a tilting or a cotilting t-structure. As a further application, we answer a question by Xi on a standard form for recollements of derived module categories for finite dimensional hereditary algebras.

Keywords

Cite

@article{arxiv.1511.02677,
  title  = {Realisation functors in tilting theory},
  author = {Chrysostomos Psaroudakis and Jorge Vitória},
  journal= {arXiv preprint arXiv:1511.02677},
  year   = {2017}
}

Comments

v3: 46 pages, minor changes in the text and new Appendix by Ester Cabezuelo Fern\'andez and Olaf Schn\"urer. To appear in Mathematische Zeitschrift

R2 v1 2026-06-22T11:40:28.612Z