Finsler geometry is a well-known generalization of Riemannian geometry which allows us to account for a possibly nontrivial structure of the space of configurations of relativistic particles. Here we establish a link between Finsler geometry and the sorts of models with curved momentum space and doubly special relativistic relativistic symmetries which have been of interest recently in the quantum-gravity literature. We use as a case study the much-studied scenario which is inspired by the κ-Poincaré quantum group and show that the relevant deformation of relativistic symmetries can be implemented within a Finsler geometry.
Realization of doubly special relativistic symmetries in Finsler geometries / Amelino Camelia, G.; Barcaroli, L.; Gubitosi, G.; Liberati, S.; Loret, N.. - In: PHYSICAL REVIEW D, PARTICLES, FIELDS, GRAVITATION, AND COSMOLOGY. - ISSN 1550-7998. - 90:12(2014). [10.1103/PhysRevD.90.125030]
Realization of doubly special relativistic symmetries in Finsler geometries
Amelino Camelia G.;Gubitosi G.;
2014
Abstract
Finsler geometry is a well-known generalization of Riemannian geometry which allows us to account for a possibly nontrivial structure of the space of configurations of relativistic particles. Here we establish a link between Finsler geometry and the sorts of models with curved momentum space and doubly special relativistic relativistic symmetries which have been of interest recently in the quantum-gravity literature. We use as a case study the much-studied scenario which is inspired by the κ-Poincaré quantum group and show that the relevant deformation of relativistic symmetries can be implemented within a Finsler geometry.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
