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ISBN: 9789812778253 981277825X 9810247931 9789810247935 981024794X 9789810247942 1281929921 9786611929923 9781281929921 Year: 2001 Publisher: River Edge, NJ : World Scientific,
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In August/September 2000, a group of 80 physicists from 53 laboratories in 15 countries met in Erice, Italy, to participate in the 38th Course of the International School of Subnuclear Physics. This book constitutes the proceedings of that meeting. It focuses on the theoretical investigation of several basic unity issues, including: (1) the understanding of gauge theories in both their continuum and lattice versions; (2) the possible existence and relevance of large extra dimensions together with the resultant lowering of the Planck/string scale to the TeV range; (3) the origin and structure o
Particles (Nuclear Physics) --- Gauge Fields (Physics) --- Science --- Gauge fields (Physics) --- Particles (Nuclear physics)
ISBN: 1281866067 9786611866068 1848161603 9781848161603 9781281866066 9781860942822 1860942822 1860942814 9781860942815 9781860942815 1860942814 1860942822 661186606X Year: 2001 Publisher: London : Imperial College Press,
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By the end of the 1970's, it was clear that all the known forces of nature (including, in a sense, gravity) were examples of gauge theories, characterized by invariance under symmetry transformations chosen independently at each position and each time. These ideas culminated with the finding of the gauge bosons (and perhaps also the Higgs boson). This important book brings together the key papers in the history of gauge theories, including the discoveries of: the role of gauge transformations in the quantum theory of electrically charged particles in the 1920's;
Gauge fields (Physics) --- Field theory (Physics) --- Classical field theory --- Continuum physics --- Physics --- Continuum mechanics --- Fields, Gauge (Physics) --- Gage fields (Physics) --- Gauge theories (Physics) --- Group theory --- Symmetry (Physics)
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ISBN: 8323500665 9788323500667 Year: 2001 Publisher: Warszawa : Wydawnictwa Uniwersytetu Warszawskiego,
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ISBN: 9812386572 9789812386571 9789810239084 9789810239091 9810239084 9810239092 Year: 2001 Publisher: Singapore ; River Edge, NJ : World Scientific,
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This work is based on Witten's lectures on topological quantum field theory. Sen Hu has included several appendices providing detals left out of Witten's lectures, and has added two more chapters to update some developments.
Gauge fields (Physics) --- Geometric quantization. --- Invariants. --- Quantum field theory --- Three-manifolds (Topology) --- Mathematics. --- Witten, E. --- Théorie quantique des champs --- Quantification géométrique. --- Champs de jauge (physique) --- Variétés topologiques à 3 dimensions. --- Mathématiques. --- Théorie quantique des champs --- Quantification géométrique. --- Variétés topologiques à 3 dimensions. --- Mathématiques. --- Geometric quantization --- Invariants --- Mathematics
ISBN: 9810239092 9810239084 Year: 2001 Publisher: Singapore World scientific
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514.8 --- 514.1 --- Quantum field theory --- -Geometric quantization --- Gauge fields (Physics) --- Three-manifolds (Topology) --- Invariants --- 3-manifolds (Topology) --- Manifolds, Three dimensional (Topology) --- Three-dimensional manifolds (Topology) --- Low-dimensional topology --- Topological manifolds --- Fields, Gauge (Physics) --- Gage fields (Physics) --- Gauge theories (Physics) --- Field theory (Physics) --- Group theory --- Symmetry (Physics) --- Geometry, Quantum --- Quantization, Geometric --- Quantum geometry --- Geometry, Differential --- Quantum theory --- Relativistic quantum field theory --- Relativity (Physics) --- 514.1 General geometry --- General geometry --- 514.8 Geometric study of objects of mechanics and physics --- Geometric study of objects of mechanics and physics --- Mathematics --- Geometric quantization --- Geometric quantization. --- Invariants. --- Théorie quantique des champs --- Quantification géométrique --- Champs de jauge (physique) --- Variétés topologiques à 3 dimensions --- Mathematics. --- Mathématiques --- Quantification géométrique. --- Variétés topologiques à 3 dimensions. --- Mathématiques.
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