The finiteness dimension of local cohomology modules and its dual notion

Abstract

Let be an ideal of a commutative Noetherian ring R and M a finitely generated R-module. We explore the behavior of the two notions f(M), the finiteness dimension of M with respect to , and, its dual notion q(M), the Artinianess dimension of M with respect to . When (R,) is local and r:=f(M) is less than f(M), the -finiteness dimension of M relative to , we prove that Hr(M) is not Artinian, and so the filter depth of on M doesn't exceeds f(M). Also, we show that if M has finite dimension and Hi(M) is Artinian for all i>t, where t is a given positive integer, then Ht(M)/ Ht(M) is Artinian. It immediately implies that if q:=q(M)>0, then Hq(M) is not finitely generated, and so f(M)≤ q(M).