Flat comodules and contramodules as directed colimits, and cotorsion periodicity

Abstract

This paper is a follow-up to arXiv:2212.09639. We consider two algebraic settings of comodules over a coring and contramodules over a topological ring with a countable base of two-sided ideals. These correspond to two (noncommutative) algebraic geometry settings of certain kind of stacks and ind-affine ind-schemes. In the context of a coring C over a noncommutative ring A, we show that all A-flat C-comodules are 1-directed colimits of A-countably presentable A-flat C-comodules. In the context of a complete, separated topological ring R with a countable base of neighborhoods of zero consisting of two-sided ideals, we prove that all flat R-contramodules are 1-directed colimits of countably presentable flat R-contramodules. We also describe arbitrary complexes, short exact sequences, and pure acyclic complexes of A-flat C-comodules and flat R-contramodules as 1-directed colimits of similar complexes of countably presentable objects. The arguments are based on a very general category-theoretic technique going back to an unpublished 1977 preprint of Ulmer and rediscovered in arXiv:2310.16773. Applications to cotorsion periodicity and coderived categories of flat objects in the respective settings are discussed. In particular, in any acyclic complex of cotorsion R-contramodules, all the contramodules of cocycles are cotorsion.