On the vanishing and finiteness properties of generalized local cohomology modules

Abstract

Let R be a commutative noetherian ring, an ideal of R and M,N finite R--modules. We prove that the following statements are equivalent. enumerate [(i)] i(M,N) is finite for all i< n. [(ii)] R(i(M,N)) ⊂ () for all i< n. [(iii)] i(M,N) is coatomic for all i< n. enumerate If M is finite and r be a non-negative integer such that r> M and i(M,N) is finite (resp. minimax) for all i≥ r, then i(M,N) is zero (resp. artinian) for all i≥ r.