Fine tuning of rainbow gravity functions and Klein-Gordon particles in cosmic string rainbow gravity spacetime

Abstract

We argue that, as long as relativistic quantum particles are in point, the variable y=E/Ep of the rainbow functions pair g_0 (y) and g_1 (y) should be fine tuned into y=|E|/Ep, where Ep is the Planck's energy scale. Otherwise, the rainbow functions will be only successful to describe the rainbow gravity effect on relativistic quantum particles and the anti-particles will be left unfortunate. Under such fine tuning, we consider Klein-Gordon (KG) particles in cosmic string rainbow gravity spacetime in a non-uniform magnetic field (i.e., B=∇ × A=32B r\,z ). Then we consider KG-particles in cosmic string rainbow gravity spacetime in a uniform magnetic field (i.e., B=∇ × A=12B \,z ). Whilst the former effectively yields KG-oscillators, the later effectively yields KG-Coulombic particles. We report on the effects of rainbow gravity on both KG-oscillators and Coulombic particles using four pairs of rainbow functions: (i) % g_0( y) =1, g_1( y) =1-ε y2% , (ii) g_0( y) =1, g_1( y) =% 1-ε y, (iii) g_0( y) =g_1( y) =( 1-ε y) -1, and (iv) g_0( y) =( eε y-1) /ε y, g_1( y) =1, where y=|E|/Ep and ε is the rainbow parameter. It is interesting to report that, all KG particles' and anti-particles' energies are symmetric about E=0 value (a natural relativistic quantum mechanical tendency), and a phenomenon of energy states to fly away and disappear from the spectrum is observed for the rainbow functions pair (iii) at γ=ε m/Ep=1.