The local-global principle for the artinianness dimensions
Abstract
Let R be a commutative noetherian ring and a an ideal of R. The goal of this paper is to establish the local-global principle for the artinianness dimension ra(M), where ra(M) is the smallest integer such that the local homology module of M is not artinian. For an artinian R-module M with the set CoassRHra(M)a(M) finite, we show that ra(M)=inf\raRp(HomR(Rp,M)) 0.03cm|0.03cmp∈ SpecR\. And the class of all modules N such that CoassRN is finite is studied.
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