The Flat Cover Conjecture for Monoid Acts

Abstract

We prove that the Flat Cover Conjecture holds for the category of (right) acts over any right-reversible monoid S, provided that the flat S-acts are closed under stable Rees extensions. The argument shows that the class F-Mono (S-act monomorphisms with flat Rees quotient) is cofibrantly generated in such categories, answering a question of Bailey and Renshaw. But cofibrant generation of SF-Mono (S-act monomorphisms with strongly flat Rees quotient) appears much stronger, since we show it implies that there is a bound on the size of the indecomposable strongly flat acts. Similarly, cofibrant generation of UF (unitary monomorphisms with flat complement) implies a bound on the size of indecomposable flat acts. The key tool is a new characterization of cofibrant generation of a class of monomorphisms in terms of ``almost everywhere" effectiveness of the class.