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BL
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| Record Number
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1022798
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b777168
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| Main Entry
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Ohtsuki, Tomotada.
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| Title & Author
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Quantum invariants : : a study of knots, 3-manifolds, and their sets /\ Tomotada Ohtsuki.
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| Publication Statement
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Singapore ;River Edge, NJ :: World Scientific,, ©2002.
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| Series Statement
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K & E series on knots and everything ;; v. 29
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| Page. NO
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1 online resource (xiii, 489 pages) :: illustrations.
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| ISBN
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9789812811172
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: 9812811176
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9789810246754
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9810246757
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| Bibliographies/Indexes
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Includes bibliographical references (pages 463-481) and index.
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| Contents
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Ch. 1. Knots and polynomial invariants. 1.1. Knots and their diagrams. 1.2. The Jones polynomial. 1.3. The Alexander polynomial -- ch. 2. Braids and representations of the braid groups. 2.1. Braids and braid groups. 2.2. Representations of the braid groups via R matrices. 2.3. Burau representation of the braid groups -- ch. 3. Operator invariants of tangles via sliced diagrams. 3.1. Tangles and their sliced diagrams. 3.2. Operator invariants of unoriented tangles. 3.3. Operator invariants of oriented tangles -- ch. 4. Ribbon Hopf algebras and invariants of links. 4.1. Ribbon Hopf algebras. 4.2. Invariants of links in ribbon Hopf algebras. 4.3. Operator invariants of tangles derived from ribbon Hopf algebras. 4.4. The quantum group U[symbol] at a generic q. 4.5. The quantum group U[symbol] at a root of unity [symbol] -- ch. 5. Monodromy representations of the braid groups derived from the Knizhnik-Zamolodchikov equation. 5.1. Representations of braid groups derived from the KZ equation. 5.2. Computing monodromies of the KZ equation. 5.3. Combinatorial reconstruction of the monodromy representations. 5.4. Quasi-triangular quasi-bialgebra. 5.5. Relation to braid representations derived from the quantum group -- ch. 6. The Kontsevich invariant. 6.1. Jacobi diagrams. 6.2. The Kontsevich invariant derived from the formal KZ equation. 6.3. Quasi-tangles and their sliced diagrams. 6.4. Combinatorial definition of the framed Kontsevich invariant. 6.5. Properties of the framed Kontsevich invariant. 6.6. Universality of the Kontsevich invariant among quantum invariants -- ch. 7. Vassiliev invariants. 7.1. Definition and fundamental properties of Vassiliev invariants. 7.2. Universality of the Kontsevich invariant among Vassiliev invariants. 7.3. A descending series of equivalence relations among knots. 7.4. Extending the set of knots by Gauss diagrams. 7.5. Vassiliev invariants as mapping degrees on configuration spaces -- ch. 8. Quantum invariants of 3-manifolds. 8.1. 3-manifolds and their surgery presentations. 8.2. The quantum SU(2) and SO(3) invariants via linear skein. 8.3. Quantum invariants of 3-manifolds via quantum invariants of links -- ch. 9. Perturbative invariants of knots and 3-manifolds. 9.1. Perturbative invariants of knots. 9.2. Perturbative invariants of homology 3-spheres. 9.3. A relation between perturbative invariants of knots and homology 3- spheres -- ch. 10. The LMO invariant. 10.1. Properties of the framed Kontsevich invariant. 10.2. Definition of the LMO invariant. 10.3. Universality of the LMO invariant among perturbative invariants. 10.4. Aarhus integral -- ch. 11. Finite type invariants of integral homology 3-spheres. 11.1. Definition of finite type invariants. 11.2. Universality of the LMO invariant among finite type invariants. 11.3. A descending series of equivalence relations among homology 3-spheres.
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| Abstract
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This book provides an extensive and self-contained presentation of quantum and related invariants of knots and 3-manifolds. Polynomial invariants of knots, such as the Jones and Alexander polynomials, are constructed as quantum invariants, i.e. invariants derived from representations of quantum groups and from the monodromy of solutions to the Knizhnik-Zamolodchikov equation. With the introduction of the Kontsevich invariant and the theory of Vassiliev invariants, the quantum invariants become well-organized. Quantum and perturbative invariants, the LMO invariant, and finite type invariants of 3-manifolds are discussed. The Chern-Simons field theory and the Wess-Zumino-Witten model are described as the physical background of the invariants.
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Invariants.
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Knot theory.
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Mathematical physics.
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Quantum field theory.
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Three-manifolds (Topology)
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Invariants.
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Knot theory.
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Mångfalder.
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Mathematical physics.
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Quantum field theory.
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SCIENCE-- Waves Wave Mechanics.
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Teoria dos nós.
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Three-manifolds (Topology)
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Topologia algébrica.
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Variedades topologicas de dimensão 3.
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| Dewey Classification
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530.14/3
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| LC Classification
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QC174.52.C66O35 2002eb
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