Min-max n-harmonic maps of degree 1 with free-boundary into Sn-1 in almost round balls

Abstract

Let n≥ 3 and let Ω⊂ Rn be a C1 bounded domain which is diffeomorphic to a ball. We investigate here the problem of finding critical points of the n-energy in the space I=\v∈ W1,n(Ω,Rn) ; \ |tr|∂ Ωv|=1\. Maps in I have a well-defined topological degree on ∂ Ω but this degree is not continuous for the weak convergence in W1,n. Hence finding critical points with prescribed degrees results in a problem of lack of compactness. We first prove that minimizers of the n-energy exist only when Ω is a round ball and when the prescribed degree is -1,0 or 1. We then develop a mountain pass approach for the (n+α)-energies and study the convergence, when α goes to zero, of the resulting critical points via a bubbling analysis. We exclude the existence of bubbles in the case where Ω is close to a ball by proving an energy gap result for free boundary n-harmonic maps from Bn to Bn. We thus obtain the existence of critical points of the n-energy with prescribed degree 1 when Ω is close to a ball.