A contramodule generalization of Neeman's flat and projective module theorem

Abstract

This paper builds on top of arXiv:2306.02734. We consider a complete, separated topological ring R with a countable base of neighborhoods of zero consisting of open two-sided ideals. The main result is that the homotopy category of projective left R-contramodules is equivalent to the derived category of the exact category of flat left R-contramodules, and also to the homotopy category of flat cotorsion left R-contramodules. In other words, a complex of flat R-contramodules is contraacyclic (in the sense of Becker) if and only if it is an acyclic complex with flat R-contramodules of cocycles, and if and only if it is coacyclic as a complex in the exact category of flat R-contramodules. These are contramodule generalizations of theorems of Neeman and of Bazzoni, Cortes-Izurdiaga, and Estrada.