Equivalence of Some Homological Conditions for Ring Epimorphisms

Abstract

Let R be a right and left Ore ring, S its set of regular elements and Q = R[S-1] = [S-1] R the classical ring of quotients of R. We prove that if F.dim(QQ) = 0, then the following conditions are equivalent: (i) Flat right R-modules are strongly flat. (ii) Matlis-cotorsion right R-modules are Enochs-cotorsion. (iii) h-divisible right R-modules are weak-injective. (iv) Homomorphic images of weak-injective right R-modules are weak-injective. (v) Homomorphic images of injective right R-modules are weak-injective. (vi) Right R-modules of weak dimension 1 are of projective dimension 1. (vii) The cotorsion pairs (P1,D) and (F1,WI) coincide. (viii) Divisible right R-modules are weak-injective. This extends a result by Fuchs and Salce (2017) for modules over a commutative ring R.