A note on a Cohen-type theorem for w-Artinian modules
Abstract
In this note, we prove that a w-module M is w-Artinian if and only if it is w-cofinitely generated and for every prime w-ideal p of R with (0:RM)⊂eq p, there exists a w-submodule Np of M such that (M/Np)w is w-cofinitely generated and (M[p])w⊂eq Np ⊂eq (0:Mp), where M[p]=s∈ R ps(0:Mp). Besides, we show that the w-operations are semi-star operations rather than star operations in general.
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