On symmetric Willmore surfaces in spheres. II: The orientation reversing case
DOI10.1016/j.difgeo.2020.101606zbMath1436.53042arXiv1407.4555OpenAlexW1806829798WikidataQ115354822 ScholiaQ115354822MaRDI QIDQ2305810
Peng Wang, Josef F. Dorfmeister
Publication date: 20 March 2020
Published in: Differential Geometry and its Applications (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1407.4555
Differential geometry of immersions (minimal, prescribed curvature, tight, etc.) (53C42) Differential geometric aspects of harmonic maps (53C43) Optimization of shapes other than minimal surfaces (49Q10) Differential geometry of symmetric spaces (53C35) Differential geometry of submanifolds of Möbius space (53A31)
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Cites Work
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- A duality theorem for Willmore surfaces
- On symmetric Willmore surfaces in spheres. I: The orientation preserving case.
- Conformal and minimal immersions of compact surfaces into the 4-sphere
- Weierstrass type representation of harmonic maps into symmetric spaces
- A simple way for determining the normalized potentials for harmonic maps
- Harmonic two-spheres in compact symmetric spaces, revisited
- Harmonic maps of nonorientable surfaces to four-dimensional manifolds
- Willmore immersions and loop groups
- Classification of homogeneous Willmore surfaces in \(S^n\)
- Willmore surfaces in spheres: the DPW approach via the conformal Gauss map
- Willmore surfaces in spheres via loop groups. III: On minimal surfaces in space forms
- Symmetries of compact Riemann surfaces
- Equivariant Minimal Immersions of S 2 into S 2m (1)
- Meromorphic Functions on a Compact Riemann Surface and Associated Complete Minimal Surfaces
- Willmore Surfaces with a Duality in S N (1)
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