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A quantum `group' is often defined as a Hopf algebra or coalgebra. Actually, quantum groups are constructed by employing certain Hopf algebras as `building blocks', and are obtained from the latter in the case of finite groups as the duals of Hopf algebras by Fourier transformation.
Let us consider next, alternative definitions of quantum groups that indeed possess extended quantum symmetries and algebraic properties distinct from those of Hopf algebras.
Quantum Groups, Quantum Operator Algebras and Related Symmetries.
For additional examples of quantum groups the reader is referred to the last six publications listed in the bibliography.
Remark: One can also consider quantum groups as a particular case of quantum groupoids in the limiting case where there is only one symmetry type present in the quantum groupoid.
Quantum theories adopted a new lease of life post 1955 when von Neumann beautifully re-formulated Quantum Mechanics (QM) in the mathematically rigorous context of Hilbert spaces and operator algebras. From a current physics perspective, von Neumann's approach to quantum mechanics has done however much more: it has not only paved the way to expanding the role of symmetry in physics, as for example with the Wigner-Eckhart theorem and its applications, but also revealed the fundamental importance in
quantum physics of the state space geometry of (quantum) operator algebras. Subsequent developments of the quantum operator algebra were aimed at identifying more general quantum symmetries than those defined for example by symmetry groups, groups of unitary operators and Lie groups. Several fruitful
quantum algebraic concepts were developed, such as: the Ocneanu paragroups-later found to be represented by Kac-Moody algebras, quantum `groups' represented either as Hopf algebras or locally compact groups with Haar measure, `quantum' groupoids represented as weak Hopf algebras, and so on. The Ocneanu paragroups case is particularly interesting as it can be considered as an extension through quantization of certain finite group symmetries to infinitely-dimensional von Neumann
type  factors (subalgebras), and are, in effect, `quantized groups' that can be nicely constructed as Kac algebras; in fact, it was recently shown that a paragroup can be constructed from a crossed product by an outer action of a Kac algebra. This suggests a relation to categorical aspects of paragroups (rigid monoidal tensor categories previously reported in the literature). The strict symmetry of the group of (quantum) unitary operators is thus naturally extended through paragroups to the symmetry of the latter structure's unitary representations; furthermore, if a subfactor of the
von Neumann algebra arises as a crossed product by a finite group action, the paragroup for this subfactor contains a very similar group structure to that of the original finite group, and also has a unitary representation theory similar to that of the original finite group. Last-but-not least, a paragroup yields a complete invariant for irreducible inclusions of AFD von Neumannn type  factors with finite index and finite depth (Theorem 2.6. of Sato, 2001). This can be considered as a kind of internal, `hidden' quantum symmetry of von Neumann algebras.
On the other hand, unlike paragroups, (quantum) locally compact groups are not readily constructed as either Kac or Hopf C*-algebras. In recent years the techniques of Hopf symmetry and those of weak Hopf C*-algebras, sometimes called quantum `groupoids' (cf Böhm et al.,1999), provide important tools-in addition to the paragroups- for studying the broader relationships of the Wigner fusion rules algebra,  -symmetry (Rehren, 1997), as well as the study of the noncommutative symmetries of subfactors within the Jones tower constructed from finite index depth 2 inclusion of factors, also recently considered from the viewpoint of related Galois correspondences (Nikshych and Vainerman, 2000).
Remark: See also the related entry on compact quantum groups (CQGs).
- 1
- M. Chaician and A. Demichev: Introduction to Quantum Groups, World Scientific (1996).
- 2
- V. G. Drinfel'd: Quantum groups, In Proc. Intl. Congress of Mathematicians, Berkeley 1986, (ed. A. Gleason), Berkeley, 798-820 (1987).
- 3
- P.. I. Etingof and A. N. Varchenko, Solutions of the Quantum Dynamical Yang-Baxter Equation and Dynamical Quantum Groups, Comm.Math.Phys., 196: 591-640 (1998).
- 4
- P. I. Etingof and A. N. Varchenko: Exchange dynamical quantum groups, Commun. Math. Phys. 205 (1): 19-52 (1999)
- 5
- P. I. Etingof and O. Schiffmann: Lectures on the dynamical Yang-Baxter equations, in Quantum Groups and Lie Theory (Durham, 1999), pp. 89-129, Cambridge University Press, Cambridge, 2001.
- 6
- J. M. G. Fell.: The Dual Spaces of C*-Algebras., Transactions of the American Mathematical Society, 94: 365-403 (1960).
- 7
- P. Hahn: Haar measure for measure groupoids., Trans. Amer. Math. Soc. 242: 1-33(1978).
- 8
- P. Hahn: The regular representations of measure groupoids., Trans. Amer. Math. Soc. 242:34-72(1978).
- 9
- C. Heunen, N. P. Landsman, B. Spitters.: A topos for algebraic quantum theory, (2008)
arXiv:0709.4364v2 [quant-ph]
- 10
- S. Majid. Quantum groups, on line
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See Also: Hopf algebra, Haar measure, compact quantum group, groupoid and group representations related to quantum symmetries, quantum groupoids, groupoids, quantum space-times, quantum category, locally compact quantum groups: uniform continuity, uniform continuity over locally compact quantum groupoids, category of C*-algebras, Yetter-Drinfel'd module, distribution, examples of groups, topic: groupoid symmetry and duality, the dual of a coalgebra is an algebra
| Other names: |
Hopf algebras, locally compact groupoids with Haar measure |
| Also defines: |
quantum group, local quantum symmetry |
| Keywords: |
quantum groups, quantum symmetries, locally compact groupoids with Haar measure, von Neumann algebras, paragroups, Quantum Groupoids, Hopf algebras, locally compact groupoids with Haar measure |
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Cross-references: Galois correspondences, noncommutative, addition, depth, index, finite, inclusions, irreducible, invariant, complete, theory, similar, contains, von Neumann algebra, unitary representations, structure's, strict, categories, tensor, rigid, categorical, relation, action, outer, product, subalgebras, factors, quantization, extension, weak Hopf algebras, Haar measure, locally compact, Lie groups, unitary operators, groups, quantum operator algebra, developments, geometry, state space, applications, current, and operator, Hilbert spaces, quantum theories, type, quantum groupoids, Bibliography, operators, algebra, Pauli matrices, spin symmetry, left Haar measure, locally compact topological groups, symmetries, quantum operator algebras, properties, algebraic, extended quantum symmetries, definitions, transformation, finite groups, blocks, coalgebra
There are 23 references to this entry.
This is version 26 of quantum groups, born on 2008-07-14, modified 2008-10-20.
Object id is 10786, canonical name is QuantumGroups.
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Classification:
| AMS MSC: | 81R50 (Quantum theory :: Groups and algebras in quantum theory :: Quantum groups and related algebraic methods) | | | 81T05 (Quantum theory :: Quantum field theory; related classical field theories :: Axiomatic quantum field theory; operator algebras) | | | 81T10 (Quantum theory :: Quantum field theory; related classical field theories :: Model quantum field theories) | | | 81T13 (Quantum theory :: Quantum field theory; related classical field theories :: Yang-Mills and other gauge theories) | | | 81T18 (Quantum theory :: Quantum field theory; related classical field theories :: Feynman diagrams) | | | 81T25 (Quantum theory :: Quantum field theory; related classical field theories :: Quantum field theory on lattices) |
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