On a new invariant of finitely generated modules over local rings

Abstract

Let M be a finitely generated module on a local ring R and : M0⊂ M1⊂...⊂ Mt=M a filtration of submodules of M such that do<d1< ... <dt=d, where di= Mi. This paper is concerned with a non-negative integer p F(M) which is defined as the least degree of all polynomials in n1, ..., nd bounding above the function (M/(x1n1, ..., xdnd)M)-Σi=0tn1...ndie(x1,..., xdi;Mi). We prove that p F(M) is independent of the choices of good systems of parameters x=x1, ..., xd. When is the dimension filtration of M we also present some relations between p(M) and the polynomial type of each Mi/Mi-1 and the dimension of the non-sequentially Cohen-Macaulay locus of M.