Several arguments suggest that the Planck scale could be the characteristic scale of curvature of momentum space. As other recent studies, we assume that the metric of momentum space determines the condition of on-shellness while the momentum space affine connection governs the form of the law of composition of momenta. We show that the possible choices of laws of composition of momenta are more numerous than the possible choices of affine connection on a momentum space. This motivates us to propose a new prescription for associating an affine connection to momentum composition, which we compare to the one most used in the recent literature. We find that the two prescriptions lead to the same picture of the so-called κ
Pathways to relativistic curved momentum spaces: De Sitter case study / Amelino-Camelia, Giovanni; Gubitosi, Giulia; Palmisano, Giovanni. - In: INTERNATIONAL JOURNAL OF MODERN PHYSICS D. - ISSN 0218-2718. - 25:2(2016), pp. 1650027-1650031. [10.1142/S0218271816500279]
Pathways to relativistic curved momentum spaces: De Sitter case study
Amelino-Camelia, Giovanni;Gubitosi, Giulia;
2016
Abstract
Several arguments suggest that the Planck scale could be the characteristic scale of curvature of momentum space. As other recent studies, we assume that the metric of momentum space determines the condition of on-shellness while the momentum space affine connection governs the form of the law of composition of momenta. We show that the possible choices of laws of composition of momenta are more numerous than the possible choices of affine connection on a momentum space. This motivates us to propose a new prescription for associating an affine connection to momentum composition, which we compare to the one most used in the recent literature. We find that the two prescriptions lead to the same picture of the so-called κI documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
