Type: Article
Kaplansky Classes and Cotorsion Theories of Complexes
Journal: Communications in Algebra (15324125)Year: 2014/05/01Volume: 42Issue: 5Pages: 1953 - 1964
Asadollahi J.aHafezi R.
DOI:10.1080/00927872.2012.751601Language: English
Abstract
In this article we provide arguments for constructing Kaplansky classes in the category of complexes out of a Kaplansky class of modules. This leads to several complete cotorsion theories in such categories. Our method gives a unified proof for most of the known cotorsion theories in the category of complexes and can be applied to the category of quasi-coherent sheaves over a scheme as well as the category of the representations of a quiver. © 2014 Copyright Taylor and Francis Group, LLC.
Author Keywords
Artin algebraDerived dimensionRepresentation dimensionTriangulated category