Generic Initial Ideals And Graded Artinian Level Algebras Not Having The Weak-Lefschetz Property

Abstract

We find a sufficient condition that is not level based on a reduction number. In particular, we prove that a graded Artinian algebra of codimension 3 with Hilbert function =(h0,h1,..., hd-1>hd=hd+1) cannot be level if hd 2d+3, and that there exists a level O-sequence of codimension 3 of type for hd 2d+k for k 4. Furthermore, we show that is not level if β1,d+2(I lex)=β2,d+2(I lex), and also prove that any codimension 3 Artinian graded algebra A=R/I cannot be level if β1,d+2((I))=β2,d+2((I)). In this case, the Hilbert function of A does not have to satisfy the condition hd-1>hd=hd+1. Moreover, we show that every codimension n graded Artinian level algebra having the Weak-Lefschetz Property has the strictly unimodal Hilbert function having a growth condition on (hd-1-hd) (n-1)(hd-hd+1) for every d > θ where h0<h1<...<hα=...=hθ>...>hs-1>hs. In particular, we find that if A is of codimension 3, then (hd-1-hd) < 2(hd-hd+1) for every θ< d <s and hs-1 3 hs, and prove that if A is a codimension 3 Artinian algebra with an h-vector (1,3,h2,...,hs) such that hd-1-hd=2(hd-hd+1)>0 and (A)d-1=0 for some r1(A)<d<s, then (I d+1) is (d+1)-regular and k(A)d=hd-hd+1.

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