Almost \(F\)-injective modules and almost flat modules. (Q2879415)

The author studies some generalizations of injectivity and flatness, defined as follows. A left \(R\)-module \(M\) is called almost \(F\)-injective, if every homomorphism from a finitely presented left ideal of \(R\) to \(M\) extends to a homomorphism of \(R\) to \(M\). A right \(R\)-module \(V\) is called almost flat if for every finitely presented left ideal \(I\) of \(R\), the canonical map \(V\otimes_RI\to V\otimes_RR\) is monic. Characterizations of some classes of rings in terms of almost \(F\)-injective and almost flat modules are also established.