\(H\)-cofinitely supplement modules. (Q2474545)

The author studies \(H\)-cofinitely supplemented modules, i.e. modules \(M\) with the property that for every submodule \(A\leq M\) with \(M/A\) finitely generated there exists a direct summand \(D\) of \(M\) such that for \(X\leq M\) we have \(M=A+X\) if and only if \(M=D+X\). Basic properties of this kind of modules are presented in Theorem 2.1. Then the author proves interesting results concerning duo modules (i.e. every submodule if fully invariant) which are \(H\)-cofinitely supplemented modules (Theorem 2.5, Theorem 2.8, Theorem 2.13). For example, in Theorem 2.13, it is proved that a duo module \(M\) is \(H\)-cofinitely supplemented if and only if every maximal submodule of \(M\) has an \(H\)-supplement in \(M\).