词条 | 量子群入门 |
释义 | 图书信息书 名: 量子群入门 作 者:沙里(Chari.V.) 出版社: 世界图书出版公司 出版时间: 2010年4月1日 ISBN: 9787510005770 开本: 16开 定价: 75.00元 内容简介《量子群入门》内容简介:A Guide to Quantum Groups,1 st ed.(978-0-521-55884-6)by Vyjayanthi haff&Andrew Pressley first published by Cambridge University Press 1994All rights reserved This reprint edition for the People's Republic of China is published by arrange-ment with the Press Syndicate ofthe University ofCambridge,Cambridge,Unit-ed Kingdom.@ mbridge University Press&Beijing Wodd Publishing Corporation 2010This book is in copyrighL No reproduction of any part may take place without thewritten permission of Cambridge University Press or Bering Wodd Publishing orporation his edition is for sale in the mainland of China only,excluding Hong KongSAR,Macao SAR and Taiwan,and may not be bought for export here. 作者简介作者:(美国)沙里(Chari.V.) 图书目录Introduction 1 Poisson-Lie groups and Lie bialgebras 1.1 Poisson manifolds A Definitions B Functorial properties C Symplectic leaves 1.2 Poisson-Lie groups A Definitions B Poisson homogeneous spaces 1.3 Lie bialgebras A The Lie bialgebra of a Poisson-Lie group B Martintriples C Examples D Derivations 1.4 Duals and doubles A Duals of Lie bialgebras and Poisson-Lie groups B The classical double C Compact Poisson-Lie groups 1.5 Dressing actions and symplectic leaves A Poisson actions B Dressing transformations and symplectic leaves C Symplectic leaves in compact Poisson-Lie groups D Thetwsted ease 1.6 Deformation of Poisson structures and quantization A Deformations of Poisson algebras BWeylquantization C Quantization as deformation Bibliographical notes 2 Coboundary PoissoI-Lie groups and the classical Yang-Baxter equation 2.1 Coboundary Lie bialgebras A Definitions B The classical Yang-Baxter equation C Examples D The classical double 2.2 Coboundary Poisson-Lie groups A The Sklyanin bracket B r-matrices and 2-cocycles CThe classicalR-matrix 2 3 Classical integrable systems A Complete integrability B Lax pairs C Integrable systems from r-matrices D Toda systems Bibliographical notes 3 Solutions of the classical Yang-Baxterequation 3.1 Constant solutions of the CYBE A The parameter space of non.skew solutions B Description of the solutions C Examples D Skew solutions and quasi-Frobenins Lie algebras 3.2 Solutions of the CYBE with spectral parameters A Clnssification ofthe solutions B Elliptic solutions C Trigonometrie solutions D Rational solutions B ibliographical notes 4 Quasitriangular Hopf algebras 4.1 Hopf algebras A Definitions B Examples C Representations of Hopf algebras D Topological Hopf algebras and duMity E Integration Oll Hopf algebras F Hopf-algebras 4.2 Quasitriangular Hopf algebras A Almost cocommutative Hopf algebras B Quasitriangular Hopf algebras C Ribbon Hopf algebras and quantum dimension D The quantum double E Twisting F Sweedler'8 example Bibliographical notes 5 Representations and quasitensor categories 5.1 Monoidal categories A Abelian categories B Monoidal categories C Rigidity D Examples E Reconstruction theorems 5.2 Quasitensor categories ATensorcategories B Quasitensor categories C Balancing D Quasitensor categories and fusion rules EQuasitensorcategoriesin quantumfieldtheory 5.3 Invariants of ribbon tangles A Isotopy invariants and monoidal functors B Tangleinvariants CCentral ek!ments Bibliographical notes 6 Quantization of Lie bialgebras 6.1 Deformations of Hopf algebras A Defmitions B Cohomologytheory CIugiditytheorems 6.2 Quantization A(Co-)Poisson Hopfalgebras B Quantization C Existence of quantizations 6.3 Quantized universal enveloping algebras ACocommut&tiveQUE algebras B Quasitriangular QUE algebras CQUE duals and doubles D The square of the antipode 6.4 The basic example A Constmctmn of the standard quantization B Algebra structure C PBW basis D Quasitriangular structure ERepresentations F A non-standard quantization 6.5 Quantum Kac-Moody algebras A The-andard quantization B The centre C Multiparameter quantizations Bibliographical notes 7 Quantized function algebras 7.1 The basic example A Definition B A basis of.fn(sL2(c)) C TheR-matrixformulation D Duality E Representations 7.2 R-matrix quantization A From It-matrices to bialgebras B From bialgebras to Hopf algebras:the quantum determinant C solutions oftheQYBE 7.3 Examples of quantized function algebras A The general definition B The quantum speciallinear group C The quantum orthogonal and symplectic groups D Multiparameter quantized function algebras 7.4 Differential calculus on quantum groups A The de Rham complex ofthe quantum plane BThe deRham complex ofthe quantum m×m matrices CThedeRhamcomplex ofthe quantum generallinear group DInvariantforms on quantumGLm 7.5 Integrable lattice models AVertexmodels BTransfermatrices …… 9 Specializations of QUE algebras 10 Representations of QUE algebas the generic case 11Representations of QUE algebas the root of unity case 12 Infinite-dimensionalquantum groups 13 Quantum harmonic analysis 14 Canonical bases 15 Quantum gruop invariants f knots and 3-manifolds 16 Quasi-Hopf algebras and the Knizhnik -Zamolodchikov equation |
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