On conformal minimal 2-spheres in complex Grassmann manifold \(G(2,n)\)
From MaRDI portal
Publication:353990
DOI10.1007/s12044-011-0019-6zbMath1269.53062OpenAlexW2044098286MaRDI QIDQ353990
Jie Fei, Xiaoxiang Jiao, Xiao-Wei Xu
Publication date: 17 July 2013
Published in: Proceedings of the Indian Academy of Sciences. Mathematical Sciences (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s12044-011-0019-6
Differential geometry of homogeneous manifolds (53C30) Differential geometry of immersions (minimal, prescribed curvature, tight, etc.) (53C42)
Related Items
Constant curvature solutions of Grassmannian sigma models. II: Non-holomorphic solutions ⋮ Rigidity of holomorphic curves of constant curvature in \(G(2,5)\) ⋮ Rigidity of homogeneous holomorphic \(S^2\) in a complex Grassmann manifold \(G(2, N)\)
Cites Work
- Unnamed Item
- Construction of homogeneous minimal 2-spheres in complex Grassmannians
- Harmonic maps from surfaces to complex projective spaces
- Pseudo-holomorphic curves of constant curvature in complex Grassmannians
- Holomorphic two-spheres in complex Grassmann manifold \(G(2, 4)\)
- Minimal 2-spheres with constant curvature in \(P_ n({\mathbb C})\)
- Harmonic maps of the two-sphere into a complex Grassmann manifold. II
- On conformal minimal immersions of \(S^ 2\) into \({\mathbb{C}}P^ n\)
- Constant curved minimal 2-spheres in \(G(2,4)\)
- Isometric imbedding of complex manifolds
- Minimal Surfaces by Moving Frames
- Quantization of Curvature of Harmonic Two-Spheres in Grassmann Manifolds
- Pseudo-holomorphic curves in complex Grassmann manifolds
- The Riemannian geometry of superminimal surfaces in complex space forms
