Blow-up algebras of secant varieties of rational normal scrolls

TL;DR

This paper investigates the algebraic structures of secant varieties of rational normal scrolls, providing explicit equations, analyzing their singularities, and computing invariants like regularity and reduction numbers.

Contribution

It offers explicit defining equations for Rees algebras and fiber cones, characterizes their singularities, and computes key algebraic invariants, advancing understanding of these geometric objects.

Findings

Fiber cones are Cohen--Macaulay normal domains.

Fiber cones have rational singularities in characteristic zero and are F-rational in positive characteristic.

Computed Castelnuovo--Mumford regularities and reduction numbers.

Abstract

In this paper, we are mainly concerned with the blow-up algebras of the secant varieties of balanced rational normal scrolls. In the first part, we give implicit defining equations of their associated Rees algebras and fiber cones. Consequently, we can tell that the fiber cones are Cohen--Macaulay normal domains. Meanwhile, these fiber cones have rational singularities in characteristic zero, and are $F$-rational in positive characteristic. The Gorensteinness of the fiber cones can also be characterized. In the second part, we compute the Castelnuovo--Mumford regularities and $\mathbf{a}$-invariants of the fiber cones. We also present the reduction numbers of the ideals defined by the secant varieties.