Dimension filtration, sequential Cohen--Macaulayness and a new polynomial invariant of graded algebras

Abstract

Let be a field and let A be a standard N-graded -algebra. Using numerical information of some invariants in the primary decomposition of 0 in A, namely the so called dimension filtration, we associate a bivariate polynomial (A;t,w), that we call the Bj\"orner--Wachs polynomial, to A. It is shown that the Bj\"orner--Wachs polynomial is an algebraic counterpart of the combinatorially defined h-triangle of finite simplicial complexes introduced by Bj\"orner \& Wachs. We provide a characterisation of sequentially Cohen--Macaulay algebras in terms of the effect of the reverse lexicographic generic initial ideal on the Bj\"orner--Wachs polynomial. More precisely, we show that a graded algebra is sequentially Cohen--Macaulay if and only if it has a stable Bj\"orner--Wachs polynomial under passing to the reverse lexicographic generic initial ideal. We conclude by discussing connections with the Hilbert series of local cohomology modules.