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| Title | Mathematical Implications of Einstein-Weyl Causality |
| Author(s) | Borchers, Hans J??rgen;Sen, Rathindra Nath |
| Publication | Berlin, Heidelberg, Springer Berlin Heidelberg, 2006. |
| Description | XII, 190 p. 37 illus : online resource |
| Abstract Note | The present work is the first systematic attempt at answering the following fundamental question: what mathematical structures does Einstein-Weyl causality impose on a point-set that has no other previous structure defined on it? The authors propose an axiomatization of Einstein-Weyl causality (inspired by physics), and investigate the topological and uniform structures that it implies. Their final result is that a causal space is densely embedded in one that is locally a differentiable manifold. The mathematical level required of the reader is that of the graduate student in mathematical physics |
| ISBN,Price | 9783540376811 |
| Keyword(s) | 1. Classical and Quantum Gravitation, Relativity Theory
2. COMPLEX MANIFOLDS
3. DIFFERENTIAL GEOMETRY
4. EBOOK
5. EBOOK - SPRINGER
6. GRAVITATION
7. Manifolds (Mathematics)
8. Manifolds and Cell Complexes (incl. Diff.Topology)
9. MATHEMATICAL PHYSICS
10. Theoretical, Mathematical and Computational Physics
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| Item Type | eBook |
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Call# | Status | Issued To | Return Due On | Physical Location |
| I05419 |
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