A new proof of Stanley's theorem on the strong Lefschetz property

Abstract

A standard graded artinian monomial complete intersection algebra A=[x1,x2,…,xn]/(x1a1,x2a2,…,xnan), with a field of characteristic zero, has the strong Lefschetz property due to Stanley in 1980. In this paper, we give a new proof for this result by using only the basic properties of linear algebra. Furthermore, our proof is still true in the case where the characteristic of is greater than the socle degree of A, namely a1+a2+·s+an - n.

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