Divisors on Rational Normal Scrolls

TL;DR

This paper investigates the algebraic properties of divisors on rational normal scrolls, focusing on the structure and resolutions of specific ideals related to the scroll's coordinate ring, including symbolic powers and their algebraic invariants.

Contribution

It provides explicit descriptions of generators, Groebner bases, and resolutions for powers of certain divisorial ideals on rational normal scrolls, extending understanding of their algebraic and homological properties.

Findings

Generated minimal sets and Groebner bases for symbolic powers of ideal K

Described a Cohen-Macaulay filtration of symbolic powers

Proved the symbolic Rees ring of K is Noetherian

Abstract

Let $A$ be the homogeneous coordinate ring of a rational normal scroll. The ring $A$ is equal to the quotient of a polynomial ring $S$ by the ideal generated by the two by two minors of a scroll matrix $\psi$ with two rows and $\ell$ catalecticant blocks. The class group of $A$ is cyclic, and is infinite provided $\ell$ is at least two. One generator of the class group is $[J]$, where $J$ is the ideal of $A$ generated by the entries of the first column of $\psi$. The positive powers of $J$ are well-understood, in the sense that the $n^{\text{th}}$ ordinary power, the $n^{th}$ symmetric power, and the $n^{th}$ symbolic power all coincide and therefore all three $n^{th}$ powers are resolved by a generalized Eagon-Northcott complex. The inverse of $[J]$ in the class group of $A$ is $[K]$, where $K$ is the ideal generated by the entries of the first row of $\psi$. We study the positive powers of $[K]$. We obtain a minimal generating set and a Groebner basis for the preimage in $S$ of the symbolic power $K^{(n)}$. We describe a filtration of $K^{(n)}$ in which all of the factors are Cohen-Macaulay $S$-modules resolved by generalized Eagon-Northcott complexes. We use this filtration to describe the modules in a finely graded resolution of $K^{(n)}$ by free $S$-modules. We calculate the regularity of the graded $S$-module $K^{(n)}$ and we show that the symbolic Rees ring of $K$ is Noetherian.