Artinian level algebras of codimension 3

Abstract

In this paper, we continue the study of which h-vectors =(1,3,..., hd-1, hd, hd+1) can be the Hilbert function of a level algebra by investigating Artinian level algebras of codimension 3 with the condition β2,d+2(I lex)=β1,d+1(I lex), where I lex is the lex-segment ideal associated with an ideal I. Our approach is to adopt an homological method called Cancellation Principle: the minimal free resolution of I is obtained from that of I lex by canceling some adjacent terms of the same shift. We prove that when β1,d+2(I lex)=β2,d+2(I lex), R/I can be an Artinian level k-algebra only if either hd-1<hd<hd+1 or hd-1=hd=hd+1=d+1 holds. We also apply our results to show that for =(1,3,..., hd-1, hd, hd+1), the Hilbert function of an Artinian algebra of codimension 3 with the condition hd-1=hd<hd+1, (a) if hd≤ 3d+2, then h-vector cannot be level, and (b) if hd≥ 3d+3, then there is a level algebra with Hilbert function for some value of hd+1.