English

Harmonic maps between two concentric annuli in $\mathbf{R}^3$

Analysis of PDEs 2018-10-02 v2

Abstract

Given two annuli A(r,R)\mathbf{A}(r,R) and A(r,R)\mathbf{A}(r_\ast, R_\ast), in R3\mathbf{R}^3 equipped with the Euclidean metric and the weighted metric y2|y|^{-2} respectively, we minimize the Dirichlet integral, i.e. the functional F[f]=A(r,R)Df2f2\mathscr{F}[f] = \int_{\mathbf{A}(r,R)} \frac{\Vert Df\Vert^2} {|f|^2}, where ff is a homeomorphism between A(r,R)\mathbf{A}(r,R) and A(r,R)\mathbf{A}(r_\ast,R_\ast), which belongs to the Sobolev class W1,2\mathscr{W}^{1,2}. The minimizer is a certain generalized radial mapping, i.e. a mapping of the form f(xη)=ρ(x)T(η)f(|x|\eta)=\rho(|x|)T(\eta), where TT is a conformal mapping of the unit sphere onto itself. It should be noticed that in this case no Nitsche phenomenon occur.

Keywords

Cite

@article{arxiv.1809.09893,
  title  = {Harmonic maps between two concentric annuli in $\mathbf{R}^3$},
  author = {David Kalaj},
  journal= {arXiv preprint arXiv:1809.09893},
  year   = {2018}
}

Comments

14 pages, this version contains some missing details from the previous version

R2 v1 2026-06-23T04:18:47.985Z