Field theory on the \(q\)-deformed fuzzy sphere. I.

Marginal deformations and quasi-Hopf algebras ⋮ FUZZY INSTANTONS ⋮ Unbraiding the braided tensor product ⋮ A projective Dirac operator on \(\mathbb{CP}^2\) within fuzzy geometry ⋮ q-deformed fuzzy Ginsparg–Wilson algebra and its q-deformed Dirac and chirality operators on quantum fuzzy two-sphere ⋮ Holographic hierarchy in the Gaussian matrix model via the fuzzy sphere ⋮ Quantized gauge theory on the fuzzy sphere as random matrix model ⋮ Construction of the Dirac operator on the \(q\)-deformed quantum space \(EAdS^2\) using a generalized \(q\)-deformed Ginsparg-Wilson algebra ⋮ Gauged Dirac operator on the q-deformed fuzzy Euclidean anti-de Sitter space using the pseudo-generalization of q-deformed Ginsparg–Wilson algebra ⋮ \(q\)-fuzzy spheres and quantum differentials on \(B_q[\mathrm{SU}_2\) and \(U_q(\mathrm{su}_2)\)] ⋮ Super quantum Dirac operator on the q-deformed super fuzzy sphere in instanton sector using quantum super Ginsparg–Wilson algebra ⋮ Dirac operator on the quantum fuzzy four-sphere SqF4 ⋮ The relativistic avatars of giant magnons and their S-matrix ⋮ Field theory on the \(q\)-deformed fuzzy sphere. II: Quantization ⋮ Quantum field theory on noncommutative spaces ⋮ Ultraviolet finite noncommutative theories ⋮ Monopole bundles over fuzzy complex projective spaces ⋮ GAUGE FIELD THEORY ON THE E_q(2)-COVARIANT PLANE ⋮ "SCHWINGER MODEL" ON THE FUZZY SPHERE ⋮ Batalin-Vilkovisky quantization of fuzzy field theories ⋮ Field theories on deformed spaces ⋮ Braided symmetries in noncommutative field theory ⋮ Physics of the \(\mathrm{so}_q(4)\) hydrogen atom

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• q-Weyl group and a multiplicative formula for universal R-matrices
• Some applications of the quantum Weyl groups
• Differential calculus on quantum spheres
• Divergencies in a field theory on quantum space.
• A q-difference analogue of \(U({\mathfrak g})\) and the Yang-Baxter equation
• Quantum spheres
• Finite dimensional representations of the quantum analog of the enveloping algebra of a complex simple Lie algebra
• Fusion rules of \(U_ q(sl(2,\mathbb{C})),q^ m=1\)
• Reality in the differential calculus on \(q\)-Euclidean spaces
• Duality and quantum groups
• Classification of three-dimensional covariant differential calculi on Podles' quantum spheres and on related spaces
• On finite 4D quantum field theory in non-commutative geometry
• Field theory on a supersymmetric lattice
• D-branes and the noncommutative torus
• String theory and noncommutative geometry
• Non-commutative world-volume geometries: branes on SU(2) and fuzzy spheres
• Differential calculus on compact matrix pseudogroups (quantum groups)
• THE SO_q(N, R)-SYMMETRIC HARMONIC OSCILLATOR ON THE QUANTUM EUCLIDEAN SPACE ${\bf R}_q^N$ AND ITS HILBERT SPACE STRUCTURE
• q-DEFORMED NON-RELATIVISTIC AND RELATIVISTIC QUANTUM MECHANICS
• Classical bosons in a non-commutative geometry
• The fuzzy sphere
• PERTURBATIVE QUANTUM GAUGE FIELDS ON THE NONCOMMUTATIVE TORUS
• Propagator on theh-deformed Lobachevsky plane
• Differential calculi and linear connections
• Integration on quantum Euclidean space and sphere
• Covariant differential calculus on the quantum hyperplane
• Quantum anti-de Sitter space and sphere at roots of unity
• Geometrical tools for quantum Euclidean spaces
• Brane dynamics in background fluxes and non-commutative geometry