Dual of Faltings' Theorems on Finiteness of Local Cohomology

Abstract

Let R be a commutative Noetherian ring and an ideal of R. We intend to establish the dual of two Faltings' Theorems for local homology modules of an Artinian module. As a consequence of this, we show that, if A is an Artinian module over semi-local complete ring R and j is an integer such that Hi(A) is Artinian for all i<j, then the set R(Hj(A)) is finite. We also introduce the notion of the nth Artinianness dimension gn(A)=∈f\g R( A): ∈(R) \ \ and \ \ R/≥ n\, for all n∈N0 and prove that g1(A)=∈f\i∈N0: Hi(A) \ \ is not minimax\, whenever R is a semi-local complete ring. Moreover, in this situation we show that R(Hg1(A)(A)) is a finite set.