TITLE:
Quantum Gravity and Dark Energy Using Fractal Planck Scaling
AUTHORS:
L. Marek Crnjac, M. S. El Naschie
KEYWORDS:
Scaling the Planck Scale; Quantum Entanglement; Dark Energy; Kaluza-Klein Space-Time; Worm Hole; Action at a Distance; Unruh Temperature; Hawking’s Negative Energy; Black Hole Physics; Cantorian Geometry; Fractals in Physics
JOURNAL NAME:
Journal of Modern Physics,
Vol.4 No.11A,
November
22,
2013
ABSTRACT:
Following an inspiring idea due to
D. Gross, we arrive at a
topological Planck energy Ep and a corresponding topological Planck length effectively scaling the Planck scale from
esoterically large and equally esoterically small numbers to a manageably where P(H) is the famous Hardy’s probability for
quantum entanglement which amounts to almost 9 percent and Based on these results, we conclude the equivalence of Einstein-Rosen “wormhole” bridges and
Einstein’s Podolsky-Rosen’s spooky action at a distance. In turn these results
are shown to be consistent with distinguishing two energy components which
results in ,
namely the quantum zero set particle component which we can measure and the quantum empty set
wave component which we cannot measure , i.e. the missing dark energy. Together
the two components add to where E is the total energy, m is the mass and c is the speed of light. In other words, the present new derivation
of the world’s most celebrated formula explains in one stroke the two most
puzzling problems of quantum physics and relativistic cosmology, namely the
physicomathematical meaning of the wave function and the nature of dark energy.
In essence they are one and the same when looked upon from the view point of
quantum-fractal geometry.