On the stability of the equator map for higher order energy functionals

Abstract

Let Bn⊂ Rn and Sn⊂ Rn+1 denote the Euclidean n-dimensional unit ball and sphere respectively. The extrinsic k-energy functional is defined on the Sobolev space Wk,2 (Bn, Sn ) as follows: Ek ext(u)=∫Bn|s u|2\,dx when k=2s, and Ek ext(u)=∫Bn|∇ s u|2\,dx when k=2s+1. These energy functionals are a natural higher order version of the classical extrinsic bienergy, also called Hessian energy. The equator map u*: Bn Sn, defined by u*(x)=(x/|x|,0), is a critical point of Ek ext(u) provided that n ≥ 2k+1. The main aim of this paper is to establish necessary and sufficient conditions on k and n under which u*: Bn Sn is minimizing or unstable for the extrinsic k-energy.