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Published **1965**
by Science Press in Peking .

Written in English

- Topology.

**Edition Notes**

Bibliography: p. [288]-291.

The Physical Object | |
---|---|

Pagination | xv, 291 p. |

Number of Pages | 291 |

ID Numbers | |

Open Library | OL16583502M |

Theory of imbedding, immersion, and isotopy of polytopes in a Euclidean space. Peking: Science Press, distributed by Guozi Shudian, (OCoLC) Document Type: Book: All Authors / Contributors: Wen-tsün Wu. , A theory of imbedding, immersion, and isotopy of polytopes in a Euclidean space Science Press Peking Wikipedia Citation Please see Wikipedia's template documentation for further citation fields that may be required. W-t Wu, A theory of imbedding, immersion, and isotopy of polytopes in a euclidean space, Science Press, Peking ()Cited by: wen-tsun, wu, a theory of imbedding immersion and isotopy of polytopes in a euclidean space Wen-tsun, Wu, Mechanical Theorem Proving in Geometries. ISBN Alma mater: Shanghai Jiao Tong University, University .

Wu Wen-tsün, A theory of imbedding, immersion, and isotopy of polytopes in a euclidean space, Science Press, Peking, MR [6] Joseph Zaks, On a minimality property of complexes, Proc. Amer. Math. Soc. 20 (), – The product of nonplanar complexes does not imbed in -space. Author: Brian R. Ummel Journal: Trans. Amer. Math A theory of imbedding, immersion, and isotopy of polytopes in a euclidean space, Science Press Retrieve articles in Transactions of the American Mathematical Society with MSC: 55A20, 57C Retrieve articles in all journals. W.T. Wu, A theory of imbedding, immersion and isotopy of polytopes in a Euclidean space, Science Press, Peking, zbMATH Google ScholarCited by: 4. A theory of imbedding, immersion, and isotopy of polytopes in a Euclidean space / Wu Wen-tsun Wu, Wen-tsün [ Book: ] [ Book, Government publication: ] This resource is very relevant to your query (score: 68,) Rational homotopy type: a constructive study via the theory of the I*-measure / Wu Wen-tsün Wu, Wen.

deﬁned an isotopy inv ariant of embeddings and immersions of p olyhedra into the Euclidean space in terms of the cohomology of deleted product spaces. In case of. The diameter of graphs of convex polytopes and f-vector theory. In: Applied Geometry and Discrete Mathematics. In: Applied Geometry and Discrete Mathematics. DIMACS Series in Discrete Mathematics and Theoretical Computer Science, vol. 4, pp. – The original reason for the introduction of h-vectors in [16] was to formulate the Generalized Lower Bound Conjecture (now Theorem [23, 18] and thus abbreviated as GLBT) for simplicial polytopes. This result is an isotopy version of the strong Whitney embedding theorem. As an isotopy version of his embedding result, Haefliger proved that if N is a compact n -dimensional k -connected manifold, then any two embeddings of N into R 2 n − k + 1 are isotopic provided 2 k + 2 ≤ n.

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