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Quantum Groups: Proceedings of Workshops held in the Euler International Mathematical Institute, Leningrad, Fall 1990 de Petr P. Kulish

Quantum Groups: Proceedings of Workshops held in the Euler International Mathematical Institute, Leningrad, Fall 1990: Lecture Notes in Mathematics, cartea 1510

Editat de Petr P. Kulish
en Limba Engleză Paperback – 25 mar 1992
The theory of Quantum Groups is a rapidly developing areawith numerous applications in mathematics and theoreticalphysics, e.g. in link and knot invariants in topology,q-special functions, conformal field theory, quantumintegrable models. The aim of the Euler Institute'sworkshops was to review and compile the progress achieved inthe different subfields. Near 100 participants came from 14countries. More than 20 contributions written up for thisbook contain new, unpublished material and half of theminclude a survey of recent results in the field (deformationtheory, graded differential algebras, contraction technique,knot invariants, q-special functions).FROM THE CONTENTS: V.G. Drinfeld: On Some Unsolved Problemsin Quantum Group Theory.- M. Gerstenhaber, A. Giaquinto,S.D. Schack: Quantum Symmetry.- L.I. Korogodsky,L.L.Vaksman: Quantum G-Spaces and Heisenberg Algebra.-J.Stasheff: Differential Graded Lie Algebras, Quasi-HopfAlgebras and Higher Homotopy Algebras.- A.Yu. Alekseev,L.D. Faddeev, M.A. Semenov-Tian-Shansky: Hidden QuantumGroups inside Kac-Moody Algebras.- J.-L. Gervais: QuantumGroup Symmetry of 2D Gravity.- T. Kohno: Invariants of3-Manifolds Based on Conformal Field Theory and HeegaardSplitting.- O. Viro: Moves of Triangulations of aPL-Manifold.
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Specificații

ISBN-13: 9783540553052
ISBN-10: 3540553053
Pagini: 420
Ilustrații: XII, 408 p.
Dimensiuni: 155 x 235 x 22 mm
Greutate: 0.59 kg
Ediția:1992
Editura: Springer Berlin, Heidelberg
Colecția Springer
Seria Lecture Notes in Mathematics

Locul publicării:Berlin, Heidelberg, Germany

Public țintă

Research

Cuprins

On some unsolved problems in quantum group theory.- Quantum symmetry.- Yang-Baxter equation and deformation of associative and Lie algebras.- Quantum G-spaces and Heisenberg algebra.- Real and imaginary forms of quantum groups.- Rank of quantum groups and braided groups in dual form.- Yangians of the “strange” lie superalgebras.- Askey-wilson polynomials as spherical functions on SU q(2).- Twisted yangians and infinite-dimensional classical Lie algebras.- Differential graded Lie algebras, quasi-hopf algebras and higher homotopy algebras.- Quantum deformation of the flag variety.- Zonal spherical functions on quantum symmetric spaces and MacDonald's symmetric polynomials.- Hidden quantum groups inside Kac-Moody algebras.- Liouville theory on the lattice and universal exchange algebra for bloch waves.- Non-local currents in 2D QFT: An alternative to the quantum inverse scattering method.- Induced representations and tensor operators for quantum groups.- Affine toda field theory: S-matrix vs perturbation.- Contractions of quantum groups.- New solutions of Yang-Baxter equations and quantum group structures.- Quantum group symmetry of 2D gravity.- Extended chiral conformal theories with a quantum symmetry.- Fusion rsos models and rational coset models.- Integrable time-discrete systems: Lattices and mappings.- On relations between poisson groups and quantum groups.- Characters of Hecke and Birman-Wenzl algebras.- Invariants of 3-Manifolds based on conformal field theory and Heegaard splitting.- The multi-variable alexander polynomial and a one—parameter family of representations of U q (sl(2,C)) at q 2=?1.- Preparation theorems for isotopy invariants of links in 3-manifolds.- Quantum invariants of 3-manifold and a glimpse of shadow topology.- Moves of triangulationsof a PL-manifold.- Yang-Baxter relation, exactly solvable models and link polynomials.- Triangularity of transition matrices for generalized Hall-Littlewood polynomials.- An open problem in quantum groups.- Two problems in quantized algebras of functions.- Unsolved problems.- On classification of ?-graded Lie algebras of constant growth which have algebra ?[h] as Cartan subalgebra.