An extension of S-artinian rings and modules to a hereditary torsion theory setting

Abstract

For any commutative ring A we introduce a generalization of S--artinian rings using a hereditary torsion theory σ instead of a multiplicative closed subset S⊂eqA. It is proved that if A is a totally σ--artinian ring, then σ must be of finite type, and A is totally σ--noetherian.

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