A remark on closed minimal hypersurfaces of 'S pot 4' with second fundamental form of constant lenght (1983)
- Autor:
- Autor USP: BRITO, FABIANO GUSTAVO BRAGA - IME
- Unidade: IME
- Assunto: GEOMETRIA DIFERENCIAL
- Language: Inglês
- Imprenta:
-
ABNT
BRITO, Fabiano Gustavo Braga. A remark on closed minimal hypersurfaces of 'S pot 4' with second fundamental form of constant lenght. . São Paulo: IME-USP. Disponível em: https://repositorio.usp.br/directbitstream/54387183-4509-4fca-a348-3703227c2e4f/316407.pdf. Acesso em: 01 maio 2024. , 1983 -
APA
Brito, F. G. B. (1983). A remark on closed minimal hypersurfaces of 'S pot 4' with second fundamental form of constant lenght. São Paulo: IME-USP. Recuperado de https://repositorio.usp.br/directbitstream/54387183-4509-4fca-a348-3703227c2e4f/316407.pdf -
NLM
Brito FGB. A remark on closed minimal hypersurfaces of 'S pot 4' with second fundamental form of constant lenght [Internet]. 1983 ;[citado 2024 maio 01 ] Available from: https://repositorio.usp.br/directbitstream/54387183-4509-4fca-a348-3703227c2e4f/316407.pdf -
Vancouver
Brito FGB. A remark on closed minimal hypersurfaces of 'S pot 4' with second fundamental form of constant lenght [Internet]. 1983 ;[citado 2024 maio 01 ] Available from: https://repositorio.usp.br/directbitstream/54387183-4509-4fca-a348-3703227c2e4f/316407.pdf - Minimal hypersurfaces of 'S POT.4' with constant gauss-kroenedecker curvature
- Closed hypersurfacesof 'S POT.4' with constant mean curvature and constant scalar curvature
- Closed hypersurfaces of S4 with two constant curvature functions
- A remark on minimal foliations of codimension two
- Remark on rotational hipersurfaces 'S POT.N'
- Total bending of flows with mean curvature correction
- The infimum of the energy of unit vector fields on odd-dimensional spheres
- On the energy of unit vector fields with isolated singularities
- Immersed hypersurfaces of a space form with distinct principal curvatures
- Une obstruction géométrique à l'existence de feuilletages de codimension 1 totalement géodésiques
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