From Wikipedia, the free encyclopedia

In differential geometry, a Dupin hypersurface is a submanifold in a space form, whose principal curvatures have globally constant multiplicities. [1]

Application

A hypersurface is called a Dupin hypersurface if the multiplicity of each principal curvature is constant on hypersurface and each principal curvature is constant along its associated principal directions. [2] All proper Dupin submanifolds arise as focal submanifolds of proper Dupin hypersurfaces. [3]

References

  1. ^ K. Shiohama (4 October 1989). Geometry of Manifolds. Elsevier. pp. 181–. ISBN  978-0-08-092578-3.
  2. ^ Themistocles M. Rassias (1992). The Problem of Plateau: A Tribute to Jesse Douglas & Tibor Radó. World Scientific. pp. 61–. ISBN  978-981-02-0556-0.
  3. ^ Robert Everist Greene; Shing-Tung Yau (1993). Partial Differential Equations on Manifolds. American Mathematical Soc. pp. 466–. ISBN  978-0-8218-1494-9.
From Wikipedia, the free encyclopedia

In differential geometry, a Dupin hypersurface is a submanifold in a space form, whose principal curvatures have globally constant multiplicities. [1]

Application

A hypersurface is called a Dupin hypersurface if the multiplicity of each principal curvature is constant on hypersurface and each principal curvature is constant along its associated principal directions. [2] All proper Dupin submanifolds arise as focal submanifolds of proper Dupin hypersurfaces. [3]

References

  1. ^ K. Shiohama (4 October 1989). Geometry of Manifolds. Elsevier. pp. 181–. ISBN  978-0-08-092578-3.
  2. ^ Themistocles M. Rassias (1992). The Problem of Plateau: A Tribute to Jesse Douglas & Tibor Radó. World Scientific. pp. 61–. ISBN  978-981-02-0556-0.
  3. ^ Robert Everist Greene; Shing-Tung Yau (1993). Partial Differential Equations on Manifolds. American Mathematical Soc. pp. 466–. ISBN  978-0-8218-1494-9.

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