On the rate of graded modules

Abstract

Let K be a field, R a standard graded K-algebra and M be a finitely generated graded R-module. The rate of M, rateR(M), is a measure of the growth of the shifts in the minimal graded free resolution of M. In this paper, we find upper bounds for this invariant. More precisely, let (A,n) be a regular local ring and I⊂eq n t be an ideal of A, where t≥ 2. We prove that if (B=A/I, m =n /I) is a Cohen-Macaulay local ring with multiplicity e(B)= h+t-1h, where h=embdim(B)-dim B, then rat(grm(B))=t-1 and for every B-module N, which annihilated by a minimal reduction of m, rategrm(B)(grm(N))≤ t-1.