A STRUCTURE DEFINED BY A TENSOR FIELD OF TYPE (1, 1) SATISFYING (f^2+a^2)(f^2-a^2)(f^2+b^2)(f^2-b^2) = 0

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概要

• 論文の詳細を見る
• 2004-04-01

著者

• Nivas Ram

  Department Of Mathematics And Astronomy Lucknow University

• DAS Lovejoy

  Department of Mathematics Kent State University

• SAXENA Mohit

  Department of Mathematics Lucknow University

関連論文

• ON CR-STRUCTURES AND F-STRUCTURE SATISFYING F^+F^+F^+…F^3+F^2+F=0
• INVARIANT SUBMANIFOLDS OF THE MANIFOLD WITH φ(κ, -(-)^)-STRUCTURE
• A STRUCTURE DEFINED BY A TENSOR FIELD OF TYPE (1, 1) SATISFYING (f^2+a^2)(f^2-a^2)(f^2+b^2)(f^2-b^2) = 0
• SECOND ORDER PARALLEL TENSORS ON ALMOST r-CONTACT MANIFOLDS
• ON DIFFERENTIABLE MANIFOLD WITH [F_1, F_2](K + 1, 1)-STRUCTURE
• STUDY OF SUBMANIFOLDS IMMERSED IN A MANIFOLD WITH QUARTER SYMMETRIC SEMI-METRIC CONNECTION

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