Resolutions as directed colimits

Abstract

A general principle suggests that "anything flat is a directed colimit of countably presentable flats". In this paper, we consider resolutions and coresolutions of modules over a countably coherent ring R (e.g., any coherent ring or any countably Noetherian ring). We show that any R-module of flat dimension n is a directed colimit of countably presentable R-modules of flat dimension at most n, and any flatly coresolved R-module is a directed colimit of countably presentable flatly coresolved R-modules. If R is a countably coherent ring with a dualizing complex, then any F-totally acyclic complex of flat R-modules is a directed colimit of F-totally acyclic complexes of countably presentable flat R-modules. The proofs are applications of an even more general category-theoretic principle going back to an unpublished 1977 preprint of Ulmer. Our proof of the assertion that every Gorenstein-flat module over a countably coherent ring is a directed colimit of countably presentable Gorenstein-flat modules uses a different technique, based on results of Saroch and Stovicek. We also discuss totally acyclic complexes of injectives and Gorenstein-injective modules, obtaining various cardinality estimates for the accessibility rank under various assumptions.

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