Existence and stability of weak critical points of r-energy functionals

Abstract

The main aim of this paper is to prove the existence of certain proper weakly r-harmonic (ES-r-harmonic) maps. We construct critical points which belong to a family of rotationally symmetric maps a : Bn Sn, where Bn and Sn denote the Euclidean n-dimensional unit ball and sphere respectively. We find that the existence of solutions within this family is restricted to specific dimensions n. Next, we prove that our critical points are unstable. In the course of this analysis we point out some specific differences between the r-harmonic and the ES-r-harmonic cases when r ≥ 4. Next, we analyse two variants of the problem. First, we replace the target manifold Sn with a rotationally symmetric ellipsoid En(b) and establish the existence of proper weakly biharmonic maps for all n ≥ 5, as well as proper weakly triharmonic maps for all n ≥ 7. Finally, we study a similar problem replacing the domain Bn with a suitable warped product manifold.