Equi-centro-affine extremal hypersurfaces in ellipsoid

Abstract

This paper explores equi-centro-affine extremal hypersurfaces in an ellipsoid. By analyzing the evolution of invariant submanifold flows under centro-affine unimodular transformations, we derive the first and second variational formulas for the associated invariant area. Stability analysis reveals that the circles with radius r=6/3 on S2(1) are characterized as being equi-centro-affine maximal. Furthermore, we provide a detailed classification of the compact isoparametric equi-centro-affine extremal hypersurfaces on (n+1)-dimensional sphere, as well as the generalized closed equi-centro-affine extremal curves on 2-dimensional sphere. These curves are shown to belong to a family of transcendental curves xp,q (p,q are two coprime positive integers satisfying that 1/2<p/q<1 ). Additionally, we establish an equi-centro-affine version of isoperimetric inequality ec-1mmL3≤ (4π-A)(2π-A)A on S2(1).