Özet:

The aim of this paper is to investigate strong notion of strongly ⨁-supplemented modules in module theory, namely strongly ⨁-locally artinian supplemented modules. We call a module M strongly ⨁-locally artinian supplemented if it is locally artinian supplemented and its locally artinian supplement submodules are direct summand. In this study, we provide the basic properties of strongly ⨁-locally artinian supplemented modules. In particular, we show that every direct summand of a strongly ⨁-locally artinian supplemented module is strongly ⨁-locally artinian supplemented. Moreover, we prove that a ring R is semiperfect with locally artinian radical if and only if every projective R-module is strongly ⨁-locally artinian supplemented.

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