Content area
Abstract
Let R be any ring. We motivate the study of a class of chain complexes of injective R-modules that we call AC-injective complexes, showing that K(AC-Inj), the chain homotopy category of all AC-injective complexes, is always a compactly generated triangulated category. In general, all DGinjective complexes are AC-injective and in fact there is a recollement linking K(AC-Inj) to the usual derived category D(R). This is based on the author's recent work inspired by work of Krause and Stovicek. Our focus here is on giving straightforward proofs that our categories are compactly generated.
Details
Title
On the homotopy category of AC-injective complexes
Author
Gillespie, James
Pages
97-115
Publication year
2017
Publication date
Feb 2017
ISSN
16733452
e-ISSN
16733576
Source type
Scholarly Journal
Language of publication
English
ProQuest document ID
1837017266
Copyright
Higher Education Press and Springer-Verlag Berlin Heidelberg 2016