On the quadratic invariant of binary sextics

Maciej Dunajski; Roger Penrose

arXiv:1504.07998·math.DG·August 3, 2016

On the quadratic invariant of binary sextics

Maciej Dunajski, Roger Penrose

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TL;DR

This paper offers a geometric characterization of binary sextic polynomials that have a zero quadratic invariant, enhancing understanding of their algebraic and geometric properties.

Contribution

It introduces a novel geometric perspective to identify binary sextics with vanishing quadratic invariant, which was not previously characterized in this way.

Findings

01

Binary sextics with zero quadratic invariant are characterized geometrically.

02

The paper establishes a link between algebraic invariants and geometric properties.

03

Provides a new criterion for identifying such sextics based on geometry.

Abstract

We provide a geometric characterisation of binary sextics with vanishing quadratic invariant.

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