On quantum weyl algebras and generalized quons

WŁadysŁaw Marcinek

Displaying similar documents to “On quantum weyl algebras and generalized quons”

$κ$ -Minkowski spacetimes and DSR algebras: fresh look and old problems.

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Quantum symmetries in noncommutative C*-systems

Marcin Marciniak (1998)

Banach Center Publications

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We introduce the notion of a completely quantum C*-system (A,G,α), i.e. a C*-algebra A with an action α of a compact quantum group G. Spectral properties of completely quantum systems are investigated. In particular, it is shown that G-finite elements form the dense *-subalgebra of A. Furthermore, properties of ergodic systems are studied. We prove that there exists a unique α-invariant state ω on A. Its properties are described by a family of modular operators ${σ_{z}}_{z \in ℂ}$ acting on . It turns...

Quantum isometries and group dual subgroups

Teodor Banica, Jyotishman Bhowmick, Kenny De Commer (2012)

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We study the discrete groups $Λ$ whose duals embed into a given compact quantum group, $\hat{Λ} \subset G$ . In the matrix case $G \subset U_{n}^{+}$ the embedding condition is equivalent to having a quotient map $Γ_{U} \to Λ$ , where $F = {Γ_{U} ∣ U \in U_{n}}$ is a certain family of groups associated to $G$ . We develop here a number of techniques for computing $F$ , partly inspired from Bichon’s classification of group dual subgroups $\hat{Λ} \subset S_{n}^{+}$ . These results are motivated by Goswami’s notion of quantum isometry group, because a compact connected Riemannian manifold cannot...

Statistics and quantum group symmetries

Gaetano Fiore, Peter Schupp (1997)

Banach Center Publications

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Using 'twisted' realizations of the symmetric groups, we show that Bose and Fermi statistics are compatible with transformations generated by compact quantum groups of Drinfel'd type.

New solutions for Yang-Baxter systems.

Nichita, Florin Felix (2006)

Acta Universitatis Apulensis. Mathematics - Informatics

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Piacitelli, Gherardo (2010)

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Quantum Painlevé equations: from continuous to discrete.

Nagoya, Hajime, Grammaticos, Basil, Ramani, Alfred (2008)

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Quantum Itô B*-algebras, their classification and decomposition

V. Belavkin (1998)

Banach Center Publications

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A simple axiomatic characterization of the general (infinite dimensional, noncommutative) Itô algebra is given and a pseudo-Euclidean fundamental representation for such algebra is described. The notion of Itô B*-algebra, generalizing the C*-algebra, is defined to include the Banach infinite dimensional Itô algebras of quantum Brownian and quantum Lévy motion, and the B*-algebras of vacuum and thermal quantum noise are characterized. It is proved that every Itô algebra is canonically...

Order parameters in $X X Z$ -type spin $\frac{1}{2}$ quantum models with Gibbsian ground states.

Skrypnik, Wolodymyr (2006)

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$T$ -systems and $Y$ -systems for quantum affinizations of quantum Kac-Moody algebras.

Kuniba, Atsuo, Nakanishi, Tomoki, Suzuki, Junji (2009)

SIGMA. Symmetry, Integrability and Geometry: Methods and Applications [electronic only]

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