Hopf-Algebra Description of Noncommutative-Space–time Symmetries

Agostini, Alessandra; Amelino‐Camelia, Giovanni; D’Andrea, Francesco

doi:10.1142/s0217751x04020919

Cited by 96 publications

(170 citation statements)

References 12 publications

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“…Such a ⋆-product should be consistent with the action of deformed symmetry generators satisfying suitably deformed Leibnitz (coproduct) rules. In the case of κ-deformation the ⋆ κ -multiplication looks as follows (see [31], [32] and references therein)…”

Section: κ-Deformed Minkowski Spacementioning

confidence: 99%

CANONICAL AND LIE-ALGEBRAIC TWIST DEFORMATIONS OF Κ-Poincaré AND CONTRACTIONS TO Κ-Galilei ALGEBRAS

Daszkiewicz

2008

Int. J. Mod. Phys. A

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Section: κ-Deformed Minkowski Spacementioning

confidence: 99%

CANONICAL AND LIE-ALGEBRAIC TWIST DEFORMATIONS OF Κ-Poincaré AND CONTRACTIONS TO Κ-Galilei ALGEBRAS

Daszkiewicz

2008

Int. J. Mod. Phys. A

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“…In our discussion we shall use the quantum κ-deformed Poincare symmetries formulated in modified bicrossproduct basis with classical Lorentz subalgebra, and the κ-deformed mass-shell invariant under the change P 0 → −P 0 [14]. Such a choice is obtained if in standard bicross-product basis [4], [5] we change P i → e P 0 2κ P i , i.e.…”

Section: Introductionmentioning

confidence: 99%

“…We also observe (see (11)) that S(p i ) = −p i . Using the expansion of noncommutative free field into the κ-deformed plane waves (14) we introduce the creation/annihilation operators satisfying the κ-deformed field oscillators algebra. The novel feature of our construction is the new multiplication rule of creation/anihilation operators which requires putting them off-shell.…”

Section: Introductionmentioning

confidence: 99%

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Κ-Deformed STATISTICS AND CLASSICAL FOUR-MOMENTUM ADDITION LAW

2008

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We consider κ-deformed relativistic symmetries described algebraically by modified Majid-Ruegg bicrossproduct basis and investigate the quantization of field oscillators for the κ-deformed free scalar fields on κ-Minkowski space. By modification of standard multiplication rule, we postulate the κ-deformed algebra of bosonic creation and annihilation operators. Our algebra permits to define the n-particle states with classical addition law for the fourmomenta in a way which is not in contradiction with the nonsymmetric quantum fourmomentum coproduct. We introduce κ-deformed Fock space generated by our κ-deformed oscillators which satisfy the standard algebraic relations with modified κ-multiplication rule. We show that such a κ-deformed bosonic Fock space is endowed with the conventional bosonic symmetry properties. Finally we discuss the role of κ-deformed algebra of oscillators in field-theoretic noncommutative framework.

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“…Therefore, one has N i ⊲ (x 2 0 − x 2 + 3ix 0 /κ) = 0 and x 2 0 − x 2 + 3ix 0 /κ is a Lorentz-invariant. Likewise, the κ-deformed Poincaré algebra is given for symmetric ordering given in section III B [21]: and its Hopf-algebraic structure, From this algebra one may find the duality relation in coordinate space through the pairing (A4) and duality Eqs. (A5,A8,A9).…”

Section: Summary and Discussionmentioning

confidence: 99%

Blackbody radiation inκ-Minkowski spacetime

2007

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We have computed the black body radiation spectra in κ−Minkowski space-time, using the quantum mechanical picture of massless scalar particles as well as effective quantum field theory picture. The black body radiation depends on how the field theory (and thus how the κ−Poincaré algebra) handles the ordering effect of the noncommutative space-time. In addition, there exists a natural momentum cut-off of the order κ, beyond which a new real mode takes its shape from a complex mode and the old real mode flows out to be a new complex mode. However, the new high momentum real mode should not be physical since its contributions to the black-body radiation spoils the commutative limit.

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Hopf-Algebra Description of Noncommutative-Space–time Symmetries

Cited by 96 publications

References 12 publications

CANONICAL AND LIE-ALGEBRAIC TWIST DEFORMATIONS OF Κ-Poincaré AND CONTRACTIONS TO Κ-Galilei ALGEBRAS

CANONICAL AND LIE-ALGEBRAIC TWIST DEFORMATIONS OF Κ-Poincaré AND CONTRACTIONS TO Κ-Galilei ALGEBRAS

Κ-Deformed STATISTICS AND CLASSICAL FOUR-MOMENTUM ADDITION LAW

Blackbody radiation inκ-Minkowski spacetime

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