Harmonic maps between two concentric annuli in R3

Abstract

Given two annuli A(r,R) and A(r, R), in R3 equipped with the Euclidean metric and the weighted metric |y|-2 respectively, we minimize the Dirichlet integral, i.e. the functional F[f] = ∫A(r,R) Df2 |f|2, where f is a homeomorphism between A(r,R) and A(r,R), which belongs to the Sobolev class W1,2. The minimizer is a certain generalized radial mapping, i.e. a mapping of the form f(|x|η)=(|x|)T(η), where T is a conformal mapping of the unit sphere onto itself. It should be noticed that in this case no Nitsche phenomenon occur.