Existence of energy-minimal diffeomorphisms between doubly connected domains
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Publication:658960
DOI10.1007/s00222-011-0327-6zbMath1255.30031arXiv1008.0652OpenAlexW2051426151WikidataQ110099006 ScholiaQ110099006MaRDI QIDQ658960
Ngin-Tee Koh, Tadeusz Iwaniec, Jani Onninen, Leonid V. Kovalev
Publication date: 9 February 2012
Published in: Inventiones Mathematicae (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1008.0652
Related Items
Strict limits of planar BV homeomorphisms, Kellogg's theorem for diffeomophic minimizers of Dirichlet energy between doubly connected Riemann surfaces, Lipschitz regularity of energy-minimal mappings between doubly connected Riemann surfaces, Lipschitz property of minimisers between double connected surfaces, Harmonic mappings with hereditary starlikeness, Total energy of radial mappings, Mappings of least Dirichlet energy and their Hopf differentials, Energy-minimal diffeomorphisms between doubly connected Riemann surfaces, Jacobian of weak limits of Sobolev homeomorphisms, Mapping of least \(\rho \)-Dirichlet energy between doubly connected Riemann surfaces, The extremal problem for weighted combined energy, Lipschitz regularity for inner-variational equations, Hereditary circularity for energy minimal diffeomorphisms, \((n,\rho)\)-harmonic mappings and energy minimal deformations between annuli, ๐-Harmonic Mappings Between Annuli: The Art of Integrating Free Lagrangians, Limits of Sobolev homeomorphisms, On J. C. C. Nitsche type inequality for annuli on Riemann surfaces, Invertibility versus Lagrange equation for traction free energy-minimal deformations, Neohookean deformations of annuli in the higher dimensional Euclidean space, Monotone Sobolev mappings of planar domains and surfaces, Harmonic hereditary convexity, Hyperelastic deformations and total combined energy of mappings between annuli, A note on the global injectivity of some light Sobolev mappings, The existence of minimizers of energy for diffeomorphisms between two-dimensional annuli in \(\mathbb{R}^2\) and \(\mathbb{R}^3\), Minimisers and Kellogg's theorem
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