Regularity of Cohen-Macaulay Specht ideals

Abstract

For a partition λ of n ∈ N, let I Spλ be the ideal of R=K[x1,…,xn] generated by all Specht polynomials of shape λ. In the previous paper, the second author showed that if R/I Spλ is Cohen-Macaulay, then λ is either (n-d,1,…,1),(n-d,d), or (d,d,1), and the converse is true if char(K)=0. In this paper, we compute the Hilbert series of R/I Spλ for λ=(n-d,d) or (d,d,1). Hence, we get the Castelnuovo-Mumford regularity of R/I Spλ, when it is Cohen-Macaulay. In particular, I Sp(d,d,1) has a (d+2)-linear resolution in the Cohen-Macaulay case.