On the Regularity of Dominant and Almost Complete Intersection Monomial Ideals

Abstract

Let R = k[x1,…,xn] be a polynomial ring in n variables over a field k, and let I be a monomial ideal of R. If I is an almost complete intersection, then we provide an explicit formula for the Castelnuovo-Mumford regularity of I in terms of the powers of the dominant variables appearing in the regular sequence contained in G(I) of length |G(I)|-1, where G(I) is the set of minimal monomial generators of I. Furthermore, if I is a dominant ideal or an almost complete intersection ideal, then we show that reg(I) ≤ reg(I), where I denotes the integral closure of I. This provides a positive answer to the Küronya-Pintye conjecture for these two classes of monomial ideals. In addition, we give some examples to clarify these results.