On purity and applications to coderived and singularity categories
Category Theory
2014-12-05 v1 Algebraic Geometry
Rings and Algebras
Representation Theory
Abstract
Given a locally coherent Grothendieck category G, we prove that the homotopy category of complexes of injective objects (also known as the coderived category of G) is compactly generated triangulated. Moreover, the full subcategory of compact objects is none other than D^b(fp G). If G admits a generating set of finitely presentable objects of finite projective dimension, then also the derived category of G is compactly generated and Krause's recollement exists. Our main tools are (a) model theoretic techniques and (b) a systematic study of the pure derived category of an additive finitely accessible category.
Cite
@article{arxiv.1412.1615,
title = {On purity and applications to coderived and singularity categories},
author = {Jan Stovicek},
journal= {arXiv preprint arXiv:1412.1615},
year = {2014}
}
Comments
45 pages