Multi-Rees Algebras of Strongly Stable Ideals

Abstract

We prove that the multi-Rees algebra R(I1 ·s Ir) of a collection of strongly stable ideals I1, …, Ir is of fiber type. In particular, we provide a Gr\"obner basis for its defining ideal as a union of a Gr\"obner basis for its special fiber and binomial syzygies. We also study the Koszulness of R(I1 ·s Ir) based on parameters associated to the collection. Furthermore, we establish a quadratic Gr\"obner basis of the defining ideal of R(I1 I2) where each of the strongly stable ideals has two quadric Borel generators. As a consequence, we conclude that this multi-Rees algebra is Koszul.