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$q$ -analog of Gelfand-Graev basis for the noncompact quantum algebra $U_{q} (u (n, 1))$ .

Asherova, Raisa M., Burdík, Čestmír, Havlíček, Miloslav, Smirnov, Yuri F., Tolstoy, Valeriy N. (2010)

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

$q$ -boson in quantum integrable systems.

Kundu, Anjan (2007)

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

$q$ -deformation of the Virasoro algebra and lattice conformal theories

Zapiski naucnych seminarov POMI

$q$ -deformed bi-local fields. II.

Toyoda, Haruki, Naka, Shigefumi (2006)

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

Quantization of Poisson Hamiltonian systems

Chiara Esposito (2015)

Banach Center Publications

In this paper we recall the concept of Hamiltonian system in the canonical and Poisson settings. We will discuss the quantization of the Hamiltonian systems in the Poisson context, using formal deformation quantization and quantum group theories.

Quantizations of braided derivations. I: Monoidal categories.

Huru, H.L. (2006)

Lobachevskii Journal of Mathematics

Quantizations of braided derivations. II: Graded modules.

Huru, H.L. (2007)

Lobachevskii Journal of Mathematics

Quantizations of braided derivations. III: Modules with action by a group.

Huru, H.L. (2007)

Lobachevskii Journal of Mathematics

Quantum Affine Algebras and Deformations of the Virasoro and $𝒲$ -Algebras

Edward Frenkel, Nikolai Reshetikhin (1995)

Recherche Coopérative sur Programme n°25

Quantum affine algebras, combinatorics of Young walls, and global bases.

Kang, Seok-Jin, Kwon, Jae-Hoon (2002)

Electronic Research Announcements of the American Mathematical Society [electronic only]

Quantum (Co)Modules for Dual Quantum Groups

Andreas Arvanitoyeorgos, Demosthenes Ellinas (1998)

Δελτίο της Ελληνικής Μαθηματικής Εταιρίας

Quantum curve in $q$ -oscillator model.

Sergeev, S. (2006)

International Journal of Mathematics and Mathematical Sciences

Quantum deformations and superintegrable motions on spaces with variable curvature.

Ragnisco, Orlando, Ballesteros, Ángel, Herranz, Francisco J., Musso, Fabio (2007)

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

Quantum deformations of the Lorentz group. The Hopf-algebra level

S. L. Woronowicz, S. Zakrzewski (1994)

Compositio Mathematica

Quantum Fibre Bundles. An Introduction

Tomasz Brzeziński (1997)

Banach Center Publications

An approach to construction of a quantum group gauge theory based on the quantum group generalisation of fibre bundles is reviewed.

Quantum fields on noncommutative spacetimes: theory and phenomenology.

Balachandran, Aiyalam P., Ibort, Alberto, Marmo, Giuseppe, Martone, Mario (2010)

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

Quantum groups in higher genus and Drinfeld’s new realizations method ( ${𝔰 𝔩}_{2}$ case)

B. Enriquez, V. N. Rubtsov (1997)

Annales scientifiques de l'École Normale Supérieure

Quantum integrable 1D anyonic models: construction through braided Yang-Baxter equation.

Kundu, Anjan (2010)

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

Quantum invariants of links and 3-valent graphs in 3-manifolds

Vladimir Turaev (1993)

Publications Mathématiques de l'IHÉS

Quantum isometries and group dual subgroups

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

Annales mathématiques Blaise Pascal

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 have non-abelian...

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