Generalized Uncertainty Principle and deformed dispersion relation induced by nonconformal metric fluctuations

TL;DR

This paper derives a generalized uncertainty principle and deformed photon dispersion relation from nonconformal metric fluctuations, linking spacetime symmetries to quantum information loss and establishing bounds on model parameters.

Contribution

It introduces a model connecting nonconformal metric fluctuations with a generalized uncertainty principle and deformed dispersion relations, aligned with quantum kappa-Poincare symmetry.

Findings

Derived a generalized uncertainty principle from metric fluctuations

Established a deformed photon dispersion relation

Provided upper bounds for model parameters

Abstract

Considering the existence of nonconformal stochastic fluctuations in the metric tensor a generalized uncertainty principle and a deformed dispersion relation (associated to the propagation of photons) are deduced. Matching our model with the so called quantum kappa--Poincare group will allow us to deduce that the fluctuation--dissipation theorem could be fulfilled without needing a restoring mechanism associated with the intrinsic fluctuations of spacetime. In other words, the loss of quantum information is related to the fact that the spacetime symmetries are described by the quantum kappa--Poincare group, and not by the usual Poincare symmetries. An upper bound for the free parameters of this model will also be obtained.