Neat-Flat Modules

Abstract

Let R be a ring and M be a right R-module. M is called neat-flat if any short exact sequence of the form 0 K N M 0 is neat-exact i.e. any homomorphism from a simple right R-module S to M can be lifted to N. We prove that, a module is neat-flat if and only if it is simple-projective. Neat-flat right R-modules are projective if and only if R is a right Σ-CS ring. Every finitely generated neat-flat right R-module is projective if and only if R is a right C-ring and every finitely generated free right R-module is extending. Every cyclic neat-flat right R-module is projective if and only if R is right CS and right C-ring. Some characterizations of neat-flat modules are obtained over the rings whose simple right R-modules are finitely presented.