| Abstract: | ![]()
Let R be a local ring and M a finitely generated generalized Cohen-Macaulay R-module such that dim R M = dim R M/αM + heightMα a for all ideals α of R. Suppose that HI j(M) ≠ 0 for an ideal I of R and an integer j > heightM I. We show that there exists an ideal J ? such that a. heightM J = j; b. the natural homomorphism HI j(M) → HI j(M) is an isomorphism, for all i > j; and, c. the natural homomorphism HI j(M) → HI j(M) is surjective. By using this theorem, we obtain some results about Betti numbers, coassociated primes, and support of local cohomology modules. |
