On the vanishing, artinianness and finiteness of local cohomology modules

Abstract

Let R be a noetherian ring, an ideal of R, and M an R--module. We prove that for a finite module M, if i(M) is minimax for all i≥ r≥ 1, then i(M) is artinian for i≥ r. A Local-global Principle for minimax local cohomology modules is shown. If i(M) is coatomic for i≤ r (M finite) then i(M) is finite for i≤ r. We give conditions for a module, which is locally minimax to be a minimax module. A non-vanishing theorem and some vanishing theorems are proved for local cohomology modules.