Twisted gauge and gravity theories on the Groenewold-Moyal plane

Balachandran, A. P.; Pinzul, A.; Qureshi, B. A.; Vaidya, Sachindeo

doi:10.1103/physrevd.76.105025

Cited by 50 publications

(102 citation statements)

References 27 publications

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“…a = 0, the integrand is proportional to (k 2 ) −n , for k 2 → 0, as we have already mentioned. But a ̸ = 0 implies that the integrand behaves like 15) which is independent of the loop order n. Using multiscale analysis, the perturbative renormalisability of this model to all orders could be shown [25].…”

Section: /P 2 Modelmentioning

confidence: 99%

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Noncommutative gauge theory and renormalisability

Wohlgenannt

2011

Proceedings of Corfu Summer Institute on Elementary Particles and Physics - Workshop on Non Commutative Field Theory and Gravit

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Section: /P 2 Modelmentioning

confidence: 99%

“…This connection is not fully understood at present and studied from different points of view, see e.g. [10,11,12,13,14,15] and references therein for a merely exemplary list of quotations.…”

Section: Introductionmentioning

confidence: 99%

Noncommutative gauge theory and renormalisability

Wohlgenannt

2011

Proceedings of Corfu Summer Institute on Elementary Particles and Physics - Workshop on Non Commutative Field Theory and Gravit

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“…Let us use the convention that the first slot in the two fold tensor product of single particle states belongs to the first particle and the second slot belongs to the second particle. Next, following [3], we introduce these labels into the Drinfel'd twist element: F …”

Section: Twisted Laughlin Wave Functionsmentioning

confidence: 99%

Interacting Quantum Topologies and the Quantum Hall Effect

Balachandran

Gupta

Kürkçüoğlu

2008

Int. J. Mod. Phys. A

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The algebra of observables of planar electrons subject to a constant background magnetic field B is given by A θ (R 2 ) ⊗ A θ (R 2 ) (θ = − 4 eB ), the product of two mutually commuting Moyal algebras. It describes the free Hamiltonian and the guiding centre coordinates. We argue that A θ (R 2 ) itself furnishes a representation space for the actions of these two Moyal algebras, and suggest physical arguments for this choice of the representation space. We give the proper setup to couple the matter fields based on A θ (R 2 ) to electromagnetic fields which are described by the abelian commutative gauge group G c (U (1)), i.e. gauge fields based on A 0 (R 2 ). This enables us to give a manifestly gauge covariant formulation of integer quantum Hall effect (IQHE). Thus, we can view IQHE as an elementary example of interacting quantum topologies, where matter and gauge fields based on algebras A θ ′ with different θ ′ appear. Two-particle wave functions in this approach are based on A θ (R 2 ) ⊗ A θ (R 2 ). We find that the full symmetry group in IQHE, which is the semi-direct product SO(2) ⋉ G c (U (1)) acts on this tensor product using the twisted coproduct ∆ θ . Consequently, as we show, many particle sectors of each Landau level have twisted statistics. As an example, we find the twisted two particle Laughlin wave functions.

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“…Twisted field theories involving real scalar field φ θ and having a φ 4 θ, * interactions are discussed in [15] and are shown to be free from UV/IR mixing. Gauge field theories with nonabelian gauge groups are constructed in [16,17]. Construction of thermal field theories is done in [18][19][20] while [21] discusses the twisted bosonization in two dimensional noncommutative spacetime.…”

Section: Introductionmentioning

confidence: 99%

Renormalization of noncommutative quantum field theories

2013

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We report on a comprehensive analysis of the renormalization of noncommutative φ 4 scalar field theories on the Groenewold-Moyal (GM) plane. These scalar field theories are twisted Poincaré invariant. Our main results are that these scalar field theories are renormalizable, free of UV/IR mixing, possess the same fixed points and β-functions for the couplings as their commutative counterparts. We also argue that similar results hold true for any generic noncommutative field theory with polynomial interactions and involving only pure matter fields. A secondary aim of this work is to provide a comprehensive review of different approaches for the computation of the noncommutative S-matrix: noncommutative interaction picture and noncommutative LSZ formalism.

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Twisted gauge and gravity theories on the Groenewold-Moyal plane

Cited by 50 publications

References 27 publications

Noncommutative gauge theory and renormalisability

Noncommutative gauge theory and renormalisability

Interacting Quantum Topologies and the Quantum Hall Effect

Renormalization of noncommutative quantum field theories

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