Hopf hypersurfaces with \(\eta\)-parallel shape operator in complex two-plane Grassmannians (Q384137)
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scientific article; zbMATH DE number 6233324
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Hopf hypersurfaces with \(\eta\)-parallel shape operator in complex two-plane Grassmannians |
scientific article; zbMATH DE number 6233324 |
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Hopf hypersurfaces with \(\eta\)-parallel shape operator in complex two-plane Grassmannians (English)
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26 November 2013
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The main theorem of this paper is the following: There exists no connected orientable Hopf hypersurface in \(G_2(\mathbb fC^{m+2})\), \(m\geq 3\) with \(\eta\)-parallel shape operator in Levi-Cività connection, that is \(g((\nabla_X A)Y,Z)= 0\) for any tangent vectors \(X,Y,Z\in h\), where the distribution \(h\) denotes the orthogonal complement of \(|\xi|= \text{span}(\xi)\) and \(\xi\) is a Reeb vector.
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complex two-plane Grassmannians
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Hopf hypersurface
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shape operator
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parallel shape operator
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\(\eta\)-parallel
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cyclic parallel
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cyclic \(\eta\)-parallel
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Levi-Cività connection
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generalized Tanaka-Webster connection
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