Calabi-Yau threefolds in Pn and Gorenstein rings

Abstract

A projectively normal Calabi-Yau threefold X ⊂eq Pn has an ideal IX which is arithmetically Gorenstein, of Castelnuovo-Mumford regularity four. Such ideals have been intensively studied when IX is a complete intersection, as well as in the case where X is codimension three. In the latter case, the Buchsbaum-Eisenbud theorem shows that IX is given by the Pfaffians of a skew-symmetric matrix. A number of recent papers study the situation when IX has codimension four. We prove there are 16 possible betti tables for an arithmetically Gorenstein ideal I with codim(I)=4=reg(I), and that exactly 8 of these occur for smooth irreducible nondegenerate threefolds. We investigate the situation in codimension five or more, obtaining examples of X with hp,q(X) not among those appearing for IX of lower codimension or as complete intersections in toric Fano varieties. A key tool in our approach is the use of inverse systems to identify possible betti tables for X.