introduction
1 poisson-lie groups and lie bialgebras
��1.1 poisson manifolds
��1.2 poisson-lie groups
��1.3 lie bialgebras
��1.4 duals and doubles
��1.5 dressing actions and symplectic leaves
��1.6 deformation of poisson structures and quantization
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2 coboundary poisson-lie groups and the classical yang-baxter equation
��2.1 coboundary lie bialgebras
��2.2 coboundary poisson-lie groups
��2.3 classical integrable systems
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3 solutions of the classical yang-baxter equation
��3.1 constant solutions of the cybe
��3.2 solutions of the cybe with spectral parameters
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4 quasitriangular hopf algebras
��4.1 hopf algebras
��4.2 quasitriangular hopf algebras
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5 representations and quasitensor categories
��5.1 monoidal categories
��5.2 quasitensor categories
��5.3 invariants of ribbon tangles
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6 quantization of lie bialgebras
��6.1 deformations of hopf algebras
��6.2 quantization
��6.3 quantized universal enveloping algebras
��6.4 the basic example
��6.5 quantum kac-moody algebras
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7 quantized function algebras
��7.1 the basic example
��7.2 r-matrix quantization
��7.3 examples of quantized function algebras
��7.4 differential calculus on quantum groups
��7.5 integrable lattice models
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8 structure of que algebras:the universal r-matrix
��8.1 the braid group action
��8.2 the quantum weyl group
��8.3 the quasitriangular structure
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9 specializations of que algebras
��9.1 rational forms
��9.2 the non-restricted specialization
��9.3 the restricted specialization
��9.4 automorphisms and real forms
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10 representations of que algebras: ��the generic casa
��10.1 classification of finite-dimensional representations
��10.2 quantum invariant theory
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11 representations of que algebras:the root of unity case
��11.1 the non-restricted case
��11.2 the restricted case
��11.3 tilting modules and the fusion tensor product
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12 infinite-dimensional quantum groups
��12.1 yangians and their representations
��12.2 quantum afiine algebras
��12.3 frobenius-schur duality for yangians and quantum affine algebras
��12.4 yangians and infinite-dimensional classical groups
��12.5 rational and trigonometric solutions of the qybe
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13 quantum harmonic analysis
��13.1 compact quantum groups and their representations
��13.2 quantum homogeneous spaces
��13.3 compact matrix quantum groups
��13.4 a non-compact quantum group
��13.5 q-special functions
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14 canonical bases
��14.1 crystal bases
��14.2 lusztig's canonical bases
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15 quantum group invariants of knots and 3-manifolds
��15.1 knots and 3-manifolds: a quick review
��15.2 link invariants from quantum groups
��15.3 modular hopf algebras and 3-manifold invariants
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16 quasi-hopf algebras and the knizhnik-zamolodchikov equation
��16.1 quasi-hopf algebras
��16.2 the kohno-drinfel'd monodromy theorem
��16.3 affine lie algebras and quantum groups
��16.4 quasi-hopf algebras and grothendieck's esquisse
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appendix kac-moody algebras
��a 1 generalized cartan matrices
��a 2 kac-moody algebras
��a 3 the invariant bilinear form
��a 4 roots
��a 5 the weyl group
��a 6 root vectors
��a 7 aide lie algebras
��a 8 highest weight modules
references
index of notation
general index