Matlis category equivalences for a ring epimorphism
Abstract
Under mild assumptions, we construct the two Matlis additive category equivalences for an associative ring epimorphism . Assuming that the ring epimorphism is homological of flat/projective dimension , we discuss the abelian categories of -comodules and -contramodules and construct the recollement of unbounded derived categories of -modules, -modules, and complexes of -modules with -co/contramodule cohomology. Further assumptions allow to describe the third category in the recollement as the unbounded derived category of the abelian categories of -comodules and -contramodules. For commutative rings, we also prove that any homological epimorphism of projective dimension is flat. Injectivity of the map is not required.
Cite
@article{arxiv.1907.04973,
title = {Matlis category equivalences for a ring epimorphism},
author = {Silvana Bazzoni and Leonid Positselski},
journal= {arXiv preprint arXiv:1907.04973},
year = {2020}
}
Comments
LaTeX 2e with tikz-cd, 30 pages, 6 commutative diagrams. v.1: This is an improved, expanded version of Sections 16-18 of the long preprint arXiv:1807.10671v1, which was divided into three parts. v.2: Terminological change of "u-h-divisible" to "u-divisible"; Remark 1.2(1), Proposition 2.4, Lemma 3.4, and Remark 3.5 inserted; references added; v.3: Final version