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Zbl 1177.83001
Asselmeyer-Maluga, Torsten; Brans, Carl H.
Exotic smoothness and physics. Differential topology and spacetime models.
(English)
[B] Singapore: World Scientific. xiv, 322~p. \sterling~40.00; \$~58.00 (2007). ISBN 978-981-02-4195-7/hbk The second author of this book is one of the founders of the now famous Brans-Dicke theory of gravitation, see e.g. [{\it C. H. Brans}, Scalar-tensor theories of gravity: some personal history. Gravitation and cosmology. Proceedings of the third international meeting, Morelia, Michoacan, Mexico, 26--30 May 2008. Melville, NY: American Institute of Physics (AIP). AIP Conference Proceedings 1083, 34--46 (2008; Zbl 1169.83005)] and for his newer works [see New level of relativity'', Gen. Relativ. Gravitation 40, No. 5, 1071--1086 (2008; Zbl 1140.83396)]. Publisher's description: The recent revolution in differential topology related to the discovery of non-standard (exotic") smoothness structures on topologically trivial manifolds such as$\Bbb R^4\$ suggests many exciting opportunities for applications of potentially deep importance for the spacetime models of theoretical physics, especially general relativity. This rich panoply of new differentiable structures lies in the previously unexplored region between topology and geometry. Just as physical geometry was thought to be trivial before Einstein, physicists have continued to work under the tacit -- but now shown to be incorrect -- assumption that differentiability is uniquely determined by topology for simple four-manifolds. Since diffeomorphisms are the mathematical models for physical coordinate transformations, Einstein's relativity principle requires that these models be physically inequivalent. This book provides an introductory survey of some of the relevant mathematics and presents preliminary results and suggestions for further applications to spacetime models." Contents: Introduction and Background; Algebraic Tools for Topology; Smooth Manifolds, Geometry; Bundles, Geometry, Gauge Theory; Gauge Theory and Moduli Space; A Guide to the Classification of Manifolds; Early Exotic Manifolds; The First Results in Dimension Four; Seiberg-Witten Theory: The Modern Approach; Physical Implications; From Differential Structures to Operator Algebras and Geometric Structures.
[Hans-Jürgen Schmidt (Potsdam)]
MSC 2000:
*83-01 Textbooks (relativity)
57-01 Textbooks (manifolds)
81-01 Textbooks (quantum theory)
57R55 Differentiable structures
53C80 Appl. of global differential geometry to physics
81T13 Gauge theories
83D05 Relativistic gravitational theories other than Einstein's
83E05 Geometrodynamics

Keywords: spacetime model

Citations: Zbl 1169.83005; Zbl 1140.83396

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