A NOTE ON COHOMOLOGICAL DIMENSION OVER COHEN-MACAULAY RINGS

Let (R, m) be a Noetherian local Cohen-Macaulay ring and I be a proper ideal of R. Assume that beta(R) (I, R) denotes the constant value of depth R (R/I-n) for n >> 0. In this paper we introduce the new notion gamma R (I, R) and then we prove the following inequalities: beta(R)(I, R) <= gamma(R) (I,R) <= dim R - cd(I,R) <= dim R/I. Also, some applications of these inequalities will be included.