Flat ring epimorphisms of countable type
Abstract
Let be an associative ring epimorphism such that is a flat left -module. Assume that the related Gabriel topology of right ideals in has a countable base. Then we show that the left -module has projective dimension at most . Furthermore, the abelian category of left contramodules over the completion of at fully faithfully embeds into the Geigle-Lenzing right perpendicular subcategory to in the category of left -modules, and every object of the latter abelian category is an extension of two objects of the former one. We discuss conditions under which the two abelian categories are equivalent. Given a right linear topology on an assocative ring , we consider the induced topology on every left -module, and for a perfect Gabriel topology compare the completion of a module with an appropriate Ext module. Finally, we characterize the -strongly flat left -modules by the two conditions of left positive-degree Ext-orthogonality to all left -modules and all -separated -complete left -modules.
Cite
@article{arxiv.1808.00937,
title = {Flat ring epimorphisms of countable type},
author = {Leonid Positselski},
journal= {arXiv preprint arXiv:1808.00937},
year = {2021}
}
Comments
LaTeX 2e with pb-diagram and xy-pic, 64 pages, 6 commutative diagrams + Corrigenda, LaTeX 2e with ulem.sty, 10 pages; v.6: corrigenda added (two mistakes, one in Remark 3.3 and the other one in Section 5); v.7: third section added to corrigenda (confusion in Remark 11.3); v.8: fourth section added to corrigenda (about an unjustified assertion in the preliminaries), main results unaffected