Noncommutative Relativistic Spacetimes and Worldlines from 2 + 1 Quantum (Anti-)de Sitter Groups

Ballesteros, Ángel; Bruno, N. Rossano; Herranz, Francisco J.

doi:10.1155/2017/7876942

Cited by 19 publications

(33 citation statements)

References 106 publications

(284 reference statements)

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“…Notice that this coproduct is written in a "bicrossproducttype" basis that generalizes the one corresponding to the (2 þ 1) κ-AdS ω algebra [44,45]. As it can be easily checked, the κ-Poincaré coproduct (2) is obtained from the above expressions in the limit ω → 0.…”

Section: The κ-(A)ds Algebra and Its Dual Poisson-lie Groupmentioning

confidence: 98%

“…(iii) The Minkowski spacetime M 3þ1 ≡ ISOð3; 1Þ= SOð3; 1Þ arises when ω ¼ Λ ¼ 0. Explicit ambient space coordinates for these three maximally symmetric Lorentzian spacetimes can be obtained by making use of a suitable realization of the Lie groups obtained by exponentiation of a faithful representation of the AdS ω Lie algebra [see [43][44][45] for details in the (2 þ 1)-dimensional case].…”

Section: The κ-(A)ds Algebra and Its Dual Poisson-lie Groupmentioning

confidence: 99%

“…Therefore, when the cosmological constant does not vanish, translations and boosts have similar algebraic properties and play complementary geometric roles (see [45] for a more detailed discussion in the context of homogeneous spaces of worldlines). As a consequence, the main idea introduced in [22] for the construction of curved momentum spaces for the κ-(A)dS algebras in (2 þ 1) dimensions becomes fully applicable: when ω ≠ 0 the momentum space has to be enlarged by including the angular momenta associated to the rotation symmetries and the hyperbolic momenta associated to boosts.…”

Section: B the Dual Poisson-lie Groupmentioning

confidence: 99%

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Curved momentum spaces from quantum (anti–)de Sitter groups in ( 3+1 ) dimensions

et al. 2018

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Curved momentum spaces associated to the κ-deformation of the (3 þ 1) de Sitter and anti-de Sitter algebras are constructed as orbits of suitable actions of the dual Poisson-Lie group associated to the κ-deformation with nonvanishing cosmological constant. The κ-de Sitter and κ-anti-de Sitter curved momentum spaces are separately analyzed, and they turn out to be, respectively, half of the (6 þ 1)-dimensional de Sitter space and half of a space with SOð4; 4Þ invariance. Such spaces are made of the momenta associated to spacetime translations and the "hyperbolic" momenta associated to boost transformations. The known κ-Poincaré curved momentum space is smoothly recovered as the vanishing cosmological constant limit from both of the constructions.

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Section: The κ-(A)ds Algebra and Its Dual Poisson-lie Groupmentioning

confidence: 98%

Section: The κ-(A)ds Algebra and Its Dual Poisson-lie Groupmentioning

confidence: 99%

Section: B the Dual Poisson-lie Groupmentioning

confidence: 99%

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Curved momentum spaces from quantum (anti–)de Sitter groups in ( 3+1 ) dimensions

et al. 2018

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“…Moreover, it is well-known that most of the structures that can be defined on classical homogeneous spaces of geodesics can be inherited from their associated motion groups. For instance, in [43] all symplectic, complex and metric structures were described, and we recall that in [39] all homogeneous spaces of worldlines corresponding to kinematical groups were studied in detail, including the pseudo-Riemannian metrics defined on them, and in [44] the (2+1) Lorentzian spaces of worldlines were considered. In particular, for the Poincaré case it was found that an invariant foliation exists in the space of worldlines and that the resulting homogeneous space is of negative curvature (see [39] for details).…”

Section: Introductionmentioning

confidence: 99%

Noncommutative spaces of worldlines

2019

Self Cite

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The space of time-like geodesics on Minkowski spacetime is constructed as a coset space of the Poincaré group in (3+1) dimensions with respect to the stabilizer of a worldline. When this homogeneous space is endowed with a Poisson homogeneous structure compatible with a given Poisson-Lie Poincaré group, the quantization of this Poisson bracket gives rise to a noncommutative space of worldlines with quantum group invariance. As an oustanding example, the Poisson homogeneous space of worldlines coming from the κ-Poincaré deformation is explicitly constructed, and shown to define a symplectic structure on the space of worldlines. Therefore, the quantum space of κ-Poincaré worldlines is just the direct product of three Heisenberg-Weyl algebras in which the parameter κ −1 plays the very same role as the Planck constant in quantum mechanics. In this way, noncommutative spaces of worldlines are shown to provide a new suitable and fully explicit arena for the description of quantum observers with quantum group symmetry.

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“…At this point it could seem surprising that the noncommutative (A)dS spacetimes (64) and (66) do not depend on the cosmological constant and, therefore, coincide with the corresponding noncommutative Minkowski spacetimes. Indeed, this is true only at first order, and higher order contributions depending on are expected to appear when the full quantum coproduct z is constructed and the all-orders noncommutative spacetime is obtained by applying the full Hopf algebra duality or, alternatively, by quantizing the allorders Poisson-Lie group whose linearization corresponds to the extended noncommutative spacetimes here presented (see [50][51][52] for explicit examples, including the noncommutative κ-(A)dS spacetime in (2 + 1) dimensions, which turns out to be a nonlinear deformation of the κ-Minkowski spacetime).…”

Section: C2 Whenmentioning

confidence: 99%

Extended noncommutative Minkowski spacetimes and hybrid gauge symmetries

Ballesteros

Mercati

2018

Eur. Phys. J. C

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We study the Lie bialgebra structures that can be built on the one-dimensional central extension of the Poincaré and (A)dS algebras in (1 + 1) dimensions. These central extensions admit more than one interpretation, but the simplest one is that they describe the symmetries of (the noncommutative deformation of) an Abelian gauge theory, U (1) or SO(2) on Minkowski or (A)dS spacetime. We show that this highlights the possibility that the algebra of functions on the gauge bundle becomes noncommutative. This is a new way in which the Coleman-Mandula theorem could be circumvented by noncommutative structures, and it is related to a mixing of spacetime and gauge symmetry generators when they act on tensor-product states. We obtain all Lie bialgebra structures on centrally-extended Poincaré and (A)dS which are coisotropic w.r.t. the Lorentz algebra, and therefore admit the construction of a noncommutative principal gauge bundle on a quantum homogeneous spacetime. It is shown that several different types of hybrid noncommutativity between the spacetime and gauge coordinates are allowed. In one of these cases, an alternative interpretation of the central extension leads to a new description of the well-known canonical noncommutative spacetime as the quantum homogeneous space of a quantum Poincaré algebra.

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Noncommutative Relativistic Spacetimes and Worldlines from 2 + 1 Quantum (Anti-)de Sitter Groups

Cited by 19 publications

References 106 publications

Curved momentum spaces from quantum (anti–)de Sitter groups in ( 3+1 ) dimensions

Curved momentum spaces from quantum (anti–)de Sitter groups in ( 3+1 ) dimensions

Noncommutative spaces of worldlines

Extended noncommutative Minkowski spacetimes and hybrid gauge symmetries

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