Temperley-Lieb Recoupling Theory and Invariants of 3-Manifolds (AM-134), Volume 134 / / Louis H. Kauffman, Sostenes Lins
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| Autore: |
Kauffman Louis H.
|
| Titolo: |
Temperley-Lieb Recoupling Theory and Invariants of 3-Manifolds (AM-134), Volume 134 / / Louis H. Kauffman, Sostenes Lins
|
| Pubblicazione: | Princeton, NJ : , : Princeton University Press, , [2016] |
| ©1994 | |
| Descrizione fisica: | 1 online resource (308 pages) : illustrations |
| Disciplina: | 514/.224 |
| Soggetto topico: | Knot theory |
| Three-manifolds (Topology) | |
| Invariants | |
| Soggetto non controllato: | 3-manifold |
| Addition | |
| Algorithm | |
| Ambient isotopy | |
| Axiom | |
| Backslash | |
| Barycentric subdivision | |
| Bijection | |
| Bipartite graph | |
| Borromean rings | |
| Boundary parallel | |
| Bracket polynomial | |
| Calculation | |
| Canonical form | |
| Cartesian product | |
| Cobordism | |
| Coefficient | |
| Combination | |
| Commutator | |
| Complex conjugate | |
| Computation | |
| Connected component (graph theory) | |
| Connected sum | |
| Cubic graph | |
| Diagram (category theory) | |
| Dimension | |
| Disjoint sets | |
| Disjoint union | |
| Elaboration | |
| Embedding | |
| Equation | |
| Equivalence class | |
| Explicit formula | |
| Explicit formulae (L-function) | |
| Factorial | |
| Fundamental group | |
| Graph (discrete mathematics) | |
| Graph embedding | |
| Handlebody | |
| Homeomorphism | |
| Homology (mathematics) | |
| Identity element | |
| Intersection form (4-manifold) | |
| Inverse function | |
| Jones polynomial | |
| Kirby calculus | |
| Knot theory | |
| Line segment | |
| Linear independence | |
| Matching (graph theory) | |
| Mathematical physics | |
| Mathematical proof | |
| Mathematics | |
| Maxima and minima | |
| Monograph | |
| Natural number | |
| Network theory | |
| Notation | |
| Numerical analysis | |
| Orientability | |
| Orthogonality | |
| Pairing | |
| Pairwise | |
| Parametrization | |
| Parity (mathematics) | |
| Partition function (mathematics) | |
| Permutation | |
| Poincaré conjecture | |
| Polyhedron | |
| Quantum group | |
| Quantum invariant | |
| Recoupling | |
| Recursion | |
| Reidemeister move | |
| Result | |
| Roger Penrose | |
| Root of unity | |
| Scientific notation | |
| Sequence | |
| Significant figures | |
| Simultaneous equations | |
| Smoothing | |
| Special case | |
| Sphere | |
| Spin network | |
| Summation | |
| Symmetric group | |
| Tetrahedron | |
| The Geometry Center | |
| Theorem | |
| Theory | |
| Three-dimensional space (mathematics) | |
| Time complexity | |
| Tubular neighborhood | |
| Two-dimensional space | |
| Vector field | |
| Vector space | |
| Vertex (graph theory) | |
| Winding number | |
| Writhe | |
| Persona (resp. second.): | LinsSostenes |
| Nota di bibliografia: | Includes bibliographical references and index. |
| Nota di contenuto: | Frontmatter -- Contents -- Chapter 1. Introduction -- Chapter 2. Bracket Polynomial, Temperley-Lieb Algebra -- Chapter 3. Jones-Wenzl Projectors -- Chapter 4. The 3-Vertex -- Chapter 5. Properties of Projectors and 3-Vertices -- Chapter 6. θ-Evaluations -- Chapter 7. Recoupling Theory Via Temperley-Lieb Algebra -- Chapter 8. Chromatic Evaluations and the Tetrahedron -- Chapter 9. A Summary of Recoupling Theory -- Chapter 10. A 3-Manifold Invariant by State Summation -- Chapter 11. The Shadow World -- Chapter 12. The Witten-Reshetikhin- Turaev Invariant -- Chapter 13. Blinks ↦ 3-Gems: Recognizing 3-Manifolds -- Chapter 14. Tables of Quantum Invariants -- Bibliography -- Index |
| Sommario/riassunto: | This book offers a self-contained account of the 3-manifold invariants arising from the original Jones polynomial. These are the Witten-Reshetikhin-Turaev and the Turaev-Viro invariants. Starting from the Kauffman bracket model for the Jones polynomial and the diagrammatic Temperley-Lieb algebra, higher-order polynomial invariants of links are constructed and combined to form the 3-manifold invariants. The methods in this book are based on a recoupling theory for the Temperley-Lieb algebra. This recoupling theory is a q-deformation of the SU(2) spin networks of Roger Penrose. The recoupling theory is developed in a purely combinatorial and elementary manner. Calculations are based on a reformulation of the Kirillov-Reshetikhin shadow world, leading to expressions for all the invariants in terms of state summations on 2-cell complexes. Extensive tables of the invariants are included. Manifolds in these tables are recognized by surgery presentations and by means of 3-gems (graph encoded 3-manifolds) in an approach pioneered by Sostenes Lins. The appendices include information about gems, examples of distinct manifolds with the same invariants, and applications to the Turaev-Viro invariant and to the Crane-Yetter invariant of 4-manifolds. |
| Titolo autorizzato: | Temperley-Lieb Recoupling Theory and Invariants of 3-Manifolds (AM-134), Volume 134 |
| ISBN: | 1-4008-8253-2 |
| Formato: | Materiale a stampa  |
| Livello bibliografico | Monografia |
| Lingua di pubblicazione: | Inglese |
| Record Nr.: | 9910154743003321 |
| Lo trovi qui: | Univ. Federico II |
| Opac: | Controlla la disponibilità qui |
Serie:
Annals of mathematics studies ; ; no. 134.