Multiple Structures with Arbitrarily Large Projective Dimension on Linear Subspaces

Abstract

Let K be an algebraically closed field. There has been much interest in characterizing multiple structures in nK defined on a linear subspace of small codimension under additional assumptions (e.g. Cohen-Macaulay). We show that no such finite characterization of multiple structures is possible if one only assumes Serre's (S1) property holds. Specifically, we prove that for any positive integers h, e 2 with (h,e) ≠ (2,2) and p 5 there is a homogeneous ideal I in a polynomial ring over K such that (1) the height of I is h, (2) the Hilbert-Samuel multiplicity of R/I is e, (3) the projective dimension of R/I is at least p and (4) the ideal I is primary to a linear prime (x1,..., xh). This result is in stark contrast to Manolache's characterization of Cohen-Macaulay multiple structures in codimension 2 and multiplicity at most 4 and also to Engheta's characterization of unmixed ideals of height 2 and multiplicity 2.