Equiaffine isoparametric functions and their regular level hypersurfaces

TL;DR

This paper introduces and characterizes equiaffine isoparametric hypersurfaces and functions in affine space, extending concepts from Euclidean geometry and establishing their fundamental properties and relationships.

Contribution

It defines equiaffine isoparametric hypersurfaces and functions, and proves their correspondence as level sets, advancing affine differential geometry.

Findings

Characterization of equiaffine isoparametric hypersurfaces

Introduction of equiaffine isoparametric functions

Establishment of the relationship between hypersurfaces and functions

Abstract

In this paper, we introduce and study the locally strongly convex equiaffine isoparametric hypersurfaces and equiaffine isoparametric functions on the affine space $A^{n+1}$. Motivated by the case on the Euclidean space $E^{n+1}$, we first introduce the concept of equiaffine parallel hypersurfaces in $A^{n+1}$, obtaining some fundamental identities with the basic equiaffine geometric invariants, and then we define the equiaffine isoparametric hypersurfaces to be ones that are among families of equiaffine parallel hypersurfaces of constant affine mean curvature in $A^{n+1}$. Finally, we introduce the concept of equiaffine isoparametric functions on $A^{n+1}$, and prove that any equiaffine isoparametric hypersurface is exactly a regular level set of some equiaffine isoparametric function.