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Topology of manifolds.
- Format:
- Book
- Author/Creator:
- Wilder, Raymond Louis, 1896-1982, author.
- Series:
- Colloquium publications (American Mathematical Society) ; v. 32.
- Colloquium Publications, 2473-3946 ; v. 32
- Language:
- English
- Subjects (All):
- Topology.
- Physical Description:
- 1 online resource (ix, 402 pages)
- Place of Publication:
- New York, American Mathematical Society, 1949.
- System Details:
- Mode of access : World Wide Web
- Contents:
- Chapter 1. Elementary concepts; characterizations of $\overline E^1$ and $S^1$ Chapter 2. Locally connected spaces; fundamental properties of the euclidean $n$-sphere Chapter 3. Peano spaces; characterizations of $S^2$ and the 2-manifolds Chapter 4. Non-metric $LC$ spaces, with applications to subsets of the 2-sphere Chapter 5. Basic algebraic topology Chapter 6. Local connectedness and local co-connectedness Chapter 7. Application of homology and cohomology theory to the theory of continua Chapter 8. Generalized manifolds; dualities of the Poincaré and Alexander type Chapter 9. Further properties of $n$-GMS; regular manifolds and generalized $n$-cells Chapter 10. Submanifolds of a manifold; decomposition into cells Chapter 11. $Lc^k$ subsets of an $n$-GM Chapter 12. Accessibility and its applications Appendix. Some unsolved problems
- Notes:
- Based on the Colloquium lectures delivered by the author at Vassar College in Sept. 1942.
- Bibliography: pages 385-391.
- Electronic reproduction. Providence, Rhode Island : American Mathematical Society. 2012
- Description based on print version record.
- Other Format:
- Print version: Wilder, Raymond Louis, 1896-1982. Topology of manifolds.
- ISBN:
- 9781470431785 (online)
- Access Restriction:
- Restricted for use by site license.
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