Quasi-translations and singular Hessians

TL;DR

This paper classifies quasi-translations and homogeneous polynomials with singular Hessians in low dimensions, revealing their structure and connections, and clarifies longstanding conjectures related to these mathematical objects.

Contribution

It provides a comprehensive classification of quasi-translations with low Jacobian rank and describes their relation to polynomials with vanishing Hessian determinants.

Findings

Classified all quasi-translations in dimension at most three.

Characterized all homogeneous quasi-translations in dimension at most four.

Connected quasi-translations to polynomials with singular Hessians, confirming a version of Hesse's theorem.

Abstract

In 1876 in [8], the authors Paul Gordan and Max N\"other classify all homogeneous polynomials h in at most five variables for which the Hessian determinant vanishes. For that purpose, they study quasi-translations which are associated with singular Hessians. We will explain what quasi-translations are and formulate some elementary properties of them. Additionally, we classify all quasi-translations with Jacobian rank one and all so-called irreducible homogeneous quasi-translations with Jacobian rank two. The latter is an important result of [8]. Using these results, we classify all quasi-translations in dimension at most three and all homogeneous quasi-translations in dimension at most four. Furthermore, we describe the connection of quasi-translation with singular Hessians, and as an application, we will classify all polynomials in dimension two and all homogeneous polynomials in dimensions three and four whose Hessian determinant vanishes. More precisely, we will show that up to linear terms, these polynomials can be expressed in n-1 linear forms, where n is the dimension, according to an invalid theorem of Hesse. In the last section, we formulate some known results and conjectures in connection with quasi-translations and singular Hessians.