Equations of the multi-Rees algebra of fattened coordinate subspaces

Abstract

In this paper we describe the equations defining the multi-Rees algebra k[x1,…,xn][I1a1t1,…,Irartr], where the ideals are generated by subsets of x1,…,xn. We also show that a family of binomials whose leading terms are squrefree, form a Gr\"obner basis for the defining equations with lexicographic order. We show that if we remove binomials that include x's, then remaining binomials form a Gr\"obner basis for the toric ideal associated to the multi-fiber ring. However binomials, including x's, in Gr\"obner basis of defining equations of the multi-Rees algebra are not necessarily defining equations of corresponding symmetric algebra. Despite this fact, we show that this family of ideals is of multi-fiber type.