Minimization of Dirichlet energy of \(j\)-degree mappings between annuli
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Publication:6650531
DOI10.1016/j.na.2024.113671MaRDI QIDQ6650531
Publication date: 9 December 2024
Published in: Nonlinear Analysis. Theory, Methods \& Applications. Series A: Theory and Methods (Search for Journal in Brave)
Harmonic, subharmonic, superharmonic functions in two dimensions (31A05) Extremal problems for conformal and quasiconformal mappings, variational methods (30C70)
Cites Work
- Unnamed Item
- Energy-minimal diffeomorphisms between doubly connected Riemann surfaces
- Existence of energy-minimal diffeomorphisms between doubly connected domains
- Deformations of annuli with smallest mean distortion
- Neohookean deformations of annuli, existence, uniqueness and radial symmetry
- Hyperelastic deformations of smallest total energy
- Regularity properties of deformations with finite energy
- Degree theory of BMO. I: Compact manifolds without boundaries
- Hyperelastic deformations and total combined energy of mappings between annuli
- Degree theory and BMO. II: Compact manifolds with boundaries. (Appendix with Petru Mironescu)
- On the Nitsche conjecture for harmonic mappings in \(\mathbb R^2\) and \(\mathbb R^3\)
- \(\sigma _2\)-diffeomorphisms between 4-dimensional annuli
- THE MODULUS OF THE IMAGE ANNULI UNDER UNIVALENT HARMONIC MAPPINGS AND A CONJECTURE OF NITSCHE
- Deformations of annuli on Riemann surfaces and the generalization of Nitsche conjecture
- On the Module of Doubly-Connected Regions Under Harmonic Mappings
- Hereditary circularity for energy minimal diffeomorphisms
- The Nitsche conjecture
- 𝑛-Harmonic Mappings Between Annuli: The Art of Integrating Free Lagrangians
- Univalent harmonic mappings of annuli and a conjecture of J. C. C. Nitsche
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