On Serre dimension of monoid algebras and Segre extensions

Abstract

Let R be a commutative noetherian ring of dimension d and M be a commutative, cancellative, torsion-free monoid of rank r. Then S-dim(R[M]) ≤ max\1, dim(R[M])-1 \ = max\1, d+r-1 \. Further, we define a class of monoids \Mn\n ≥ 1 such that if M ∈ Mn is seminormal, then S-dim(R[M]) ≤ dim(R[M]) - n= d+r-n, where 1 ≤ n ≤ r. As an application, we prove that for the Segre extension Smn(R) over R, S-dim(Smn(R)) ≤ dim(Smn(R)) - [m+n-1min\m,n\] = d+m+n-1 - [m+n-1min\m,n\].