Two-parameter extensions of the \kappa-Poincar\'{e} quantum deformation
J. Lukierski, V.D. Lyakhovsky (Inst. Theor. Phys., Univ. Wroclaw)
TL;DR
This paper explores two-parameter extensions of the -Poincare9 algebra using modified Yang-Baxter equations, presenting explicit quantizations and twists that introduce new deformation parameters and structures.
Contribution
It introduces two novel two-parameter extensions of the -Poincare9 algebra, providing explicit quantizations and twist functions involving nonclassical generators.
Findings
Explicit two-parameter -Poincare9 quantum Hopf algebras derived.
New deformation parameters / or / introduced.
Twist functions with nonclassical generators and -deformed coproducts described.
Abstract
We consider the extensions of classical r-matrix for \kappa-deformed Poincar\'{e} algebra which satisfy modified Yang-Baxter equation. Two examples introducing additional deformation parameter (dimensionfull \frac{1}{\widetilde{\kappa}} or dimensionless \xi) are presented. We describe the corresponding quantization (two-parameter \kappa-Poincar\'{e} quantum Hopf algebras) in explicite form as obtained by twisting of standard \kappa-deformed framework. In the second example quantum twist function depends on nonclassical generators, with \kappa-deformed coproduct. Finally we mention also the ``soft'' twists with carrier in fourmomenta sector.
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Taxonomy
TopicsAdvanced Topics in Algebra · Algebraic structures and combinatorial models · Nonlinear Waves and Solitons