κ-Minkowski spacetime and the star product realizations

Meljanac, Stjepan; Samsarov, Andjelo; Stojić, Marko; Gupta, Kumar S.

doi:10.1140/epjc/s10052-007-0450-0

Cited by 148 publications

(225 citation statements)

References 58 publications

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“…In [14,17] a universal formula was given for the representation of Lie algebra generators as formal power series of the corresponding structure constants with the coefficients in Bernoulli numbers. In [18] the above procedure was applied to obtain the closed formula of the polydifferential representation for the κ-Minkowski Lie algebra on R d . Here we will follow the same approach.…”

Section: Polydifferential Representation For Su(2)mentioning

confidence: 99%

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Noncommutative ℝ d $$ {\mathrm{\mathbb{R}}}^d $$ via closed star product

Kupriyanov

Vitale

2015

J. High Energ. Phys.

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Abstract:We consider linear star products on R d of Lie algebra type. First we derive the closed formula for the polydifferential representation of the corresponding Lie algebra generators. Using this representation we define the Weyl star product on the dual of the Lie algebra. Then we construct a gauge operator relating the Weyl star product with the one which is closed with respect to some trace functional, Tr (f g) = Tr (f · g). We introduce the derivative operator on the algebra of the closed star product and show that the corresponding Leibniz rule holds true up to a total derivative. As a particular example we study the space R 3 θ with su(2) type noncommutativity and show that in this case the closed star product is the one obtained from the Duflo quantization map. As a result a Laplacian can be defined such that its commutative limit reproduces the ordinary commutative one. The deformed Leibniz rule is applied to scalar field theory to derive conservation laws and the corresponding noncommutative currents.

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Section: Polydifferential Representation For Su(2)mentioning

confidence: 99%

“…the function X (t) is given by 18) and the expression X i l −θ 2 M /2 is understood as a function of the matrix M in the sense of power series,…”

Section: Jhep08(2015)024mentioning

confidence: 99%

Noncommutative ℝ d $$ {\mathrm{\mathbb{R}}}^d $$ via closed star product

Kupriyanov

Vitale

2015

J. High Energ. Phys.

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“…This paper is a continuation of earlier work [6,7], following [8], whose aim is systematically to construct κ-deformed quantum field theory from the following particular perspective. (Other approaches can be found in [9][10][11][12][13][14][15][16][17][18][19][20][21][22][23][24].) We recall the viewpoint on quantum field theory taken by Weinberg in [25], namely that quantum field theory takes the form it does because this is essentially the only way to construct a quantum mechanical theory of point particles with Poincaré symmetry -given only a very limited number of additional physical principles, like cluster decomposition.…”

Section: Introductionmentioning

confidence: 99%

On κ-deformation and triangular quasibialgebra structure

Young

Zegers

2009

Nuclear Physics B

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We show that, up to terms of order κ −5 , the κ-deformed Poincaré algebra can be endowed with a triangular quasibialgebra structure. The universal R matrix and coassociator are given explicitly to the first few orders. In the context of κ-deformed quantum field theory, we argue that this structure, assuming it exists to all orders, ensures that states of any number of identical particles, in any representation, can be defined in a κ-covariant fashion.

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“…Given the existence of this deformation, one would like to know how much of relativistic physics carries over to the κ-deformed case; in particular, there has been much interest in understanding κ-deformed quantum field theory [6,7,8,9,10]. Beyond the intrinsic mathematical appeal 3 , a physical motivation for this interest is that κ-Poincaré is known to be a symmetry of the kinematics (i.e.…”

Section: Introductionmentioning

confidence: 99%

Covariant particle exchange for κ-deformed theories in dimensions

Young

Zegers

2008

Nuclear Physics B

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We consider the exchange of identical scalar particles in theories with κ-deformed Poincaré symmetry. We argue that, at least in 1+1 dimensions, the symmetric group S N can be realized on the space of N -particle states in a κ-covariant fashion. For the case of two particles this realization is unique: we show that there is only one non-trivial intertwiner, which automatically squares to the identity.

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κ-Minkowski spacetime and the star product realizations

Cited by 148 publications

References 58 publications

Noncommutative ℝ d $$ {\mathrm{\mathbb{R}}}^d $$ via closed star product

Noncommutative ℝ d $$ {\mathrm{\mathbb{R}}}^d $$ via closed star product

On κ-deformation and triangular quasibialgebra structure

Covariant particle exchange for κ-deformed theories in dimensions

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