Jordan degree type for codimension three Gorenstein algebras of small Sperner number

Abstract

The Jordan type PA, of a linear form acting on a graded Artinian algebra A over a field k is the partition describing the Jordan block decomposition of the multiplication map m, which is nilpotent. The Jordan degree type SA, is a finer invariant, describing also the initial degrees of the simple submodules of A in a decomposition of A as k[]-modules. The set of Jordan types of A or Jordan degree types (JDT) of A as varies, is an invariant of the algebra. This invariant has been studied for codimension two graded algebras. We here extend the previous results to certain codimension three graded Artinian Gorenstein (AG) algebras - those of small Sperner number. Given a Gorenstein sequence T - one possible for the Hilbert function of a codimension three AG algebra - the irreducible variety Gor(T) parametrizes all Gorenstein algebras of Hilbert function T. We here completely determine the JDT possible for all pairs (A,), A∈ Gor(T), for Gorenstein sequences T of the form T=(1,3,sk,3,1) for Sperner number s=3,4,5 and arbitrary multiplicity k. For s=6 we delimit the prospective JDT, without verifying that each occurs.