Flat commutative ring epimorphisms of almost Krull dimension zero
Abstract
We consider flat epimorphisms of commutative rings such that, for every ideal for which , the quotient ring is semilocal of Krull dimension zero. Under these assumptions, we show that the projective dimension of the -module does not exceed . We also describe the Geigle-Lenzing perpendicular subcategory in . Assuming additionally that the ring and all the rings are perfect, we show that all flat -modules are -strongly flat. Thus we obtain a generalization of some results of the paper arXiv:1801.04820, where the case of the localization of the ring at a multiplicative subset was considered.
Cite
@article{arxiv.2009.03389,
title = {Flat commutative ring epimorphisms of almost Krull dimension zero},
author = {Leonid Positselski},
journal= {arXiv preprint arXiv:2009.03389},
year = {2023}
}
Comments
LaTeX 2e, 17 pages; v.2: small expositional improvements, references updated; v.3: two misprints corrected -- this is intended as the final version