On monomial ideals and their socles

Abstract

For a finite subset M⊂ [x1,…,xd] of monomials, we describe how to constructively obtain a monomial ideal I⊂eq R = K[x1,…,xd] such that the set of monomials in Soc(I) I is precisely M, or such that M⊂eq R/I is a K-basis for the the socle of R/I. For a given M we obtain a natural class of monomials I with this property. This is done by using solely the lattice structure of the monoid [x1,…,xd]. We then present some duality results by using anti-isomorphisms between upsets and downsets of ( Zd,). Finally, we define and analyze zero-dimensional monomial ideals of R of type k, where type 1 are exactly the Artinian Gorenstein ideals, and describe the structure of such ideals that correspond to order-generic antichains in Zd.