On some properties of ⊕ -supplemented modules

A module M is ⊕ -supplemented if every submodule of M has a supplement which is a direct summand of M . In this paper, we show that a quotient of a ⊕ -supplemented module is not in general ⊕ -supplemented. We prove that over a commutative ring R , every finitely generated ⊕ -supplemented R -module M having dual Goldie dimension less than or equal to three is a direct sum of local modules. It is also shown that a ring R is semisimple if and only if the class of ⊕ -supplemented R -modules coincides with the class of injective R -modules. The structure of ⊕ -supplemented modules over a commutative principal ideal ring is completely determined.