A note on nontrivial intersection for selfmaps of complex Grassmann manifolds (Q1704382)
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| Language | Label | Description | Also known as |
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| English | A note on nontrivial intersection for selfmaps of complex Grassmann manifolds |
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A note on nontrivial intersection for selfmaps of complex Grassmann manifolds (English)
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9 March 2018
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The setting of this note is provided by the complex Grassmann manifold \(\mathbb{C}M(k, n)=G(k, n)\), the space of \(k\)-planes in \(\mathbb{C}^{n+k}\). The main result (Theorem 4) states that for every continuous selfmap \(f:G(k, n)\rightarrow G(k, n)\) there exists \(V^k\in G(k, n)\) such that \(V^k\cap f(V^k)\neq \{0\}\). The main tool in the proof is the total Chern class of \(\gamma ^k\), the canonical \(k\)-plane bundle over \(G(k, n)\).
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fixed point
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complex Grassmann manifold
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