On Brezis Open Problem 3.1

Abstract

Let B1 be the unit disk in R2. We consider the harmonic map equation -Δu=|∇ u|2u, subject to the Dirichlet boundary condition u(eiθ)=(Rθ,Rθ,1-R2):=gR, where 0<R<1 and u: B1 S2 is understood in the weak harmonic-map sense. In 1983, Brezis and Coron proved the existence of two explicit solutions of this nonlinear Dirichlet problem and showed that they are the unique minimizers in their respective relative homotopy classes. In this paper, we resolve a long-standing open question originally posed in their work, later posed as Open Problem 3.1 in Brezis Favorite Open Problems List. Specifically, we prove that these two explicit maps are the only weak harmonic maps with boundary trace gR, thereby providing a definitive affirmative answer to Brezis open problem. The proof is based on a boundary rigidity argument. An auxiliary potential X associated with u, the Pohozaev identity for the Hopf differential, and the planar isoperimetric inequality imply |ur| R, ur· uθ0 ∂ B1. Thus the Hopf differential vanishes on the boundary and hence, by holomorphicity, on the whole disk. The problem is then reduced to the conformal case, where a stereographic-coordinate classification gives exactly the two Brezis--Coron maps.