Rigidity of superminimal surfaces in complex projective spaces

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概要

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• This paper solves the rigidity problem for branched superminimal immersions in complex projective spaces. Bertinis theorem and Chow varieties in algebraic geometry as well as results on Teichmuller spaces and the deformation theory of holomorphic maps and used.

• 東北大学の論文

著者

• Mo Xiaokang

  Department Of Mathematics Washington University

• Chi Quo-Shin

  Department of Mathematics, Washington University

• Chi Quo-shin

  Department Of Mathematics Washington University

関連論文

• Rigidity of superminimal surfaces in complex projective spaces
• The dimension of the moduli space of superminimal surfaces of a fixed degree and conformal structure in the 4-sphere
• Normalized potentials of minimal surfaces in spheres
• Rigidity of superminimal immersions of compact Riemann surfaces into CP^2

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