Read full paper at:
We give a mathematical golden mean distribution based probabilistic confirmation of a recent spectacular experiment with light. The experiment in question is a three-slit variant of the well known two-slit set up of quantum mechanics. The outcome of the sophisticated experiment revealed the looped path of light on the quantum scale and consequently the Peano-Hilbert geometry of spacetime, ergo its fractal-Cantorian nature. The mathematics used here on the other hand is the remarkably simple and insightful golden mean probability distribution known from a famous paradox known in social sciences as the voter paradox.
Dark Energy, the Voter Paradox, Golden Mean Distribution, Looped Light, the Triple-Slit Experiment, Cantorian-Fractal Spacetime
Cite this paper
El Naschie, M. (2017) Looped Light on Dark Energy. Journal of Quantum Information Science, 7, 1-5. doi: 10.4236/jqis.2017.71001.
|||‘tHooft, G. (1997) In Search of the Ultimate Building Blocks. Cambridge University Press, Cambridge, 68-69.|
|||Pittman, J. (1993) Probability. Springer, New York, USA, 254.|
|||Magana-Loaiza, O.S., de Leon, I., Mirhosseini, M., et al. (2016) Exotic Looped Trajectories in the Three-Slit Interference. ArXiv:1610.0858V1[quant-ph]|
|||El Naschie, M.S. (2017) The Quantum Triple-Slit Experiment and Cosmic Dark Energy. Open Journal of Microphysics, 7, 31-35.
|||El Naschie, M.S. The Looped Light of the Triple-Slit Real Experiment as a Confirmation for the Extra Dimensions of Quantum Spacetime and the Reality of Dark Energy. Optical and Photonic Journal, in Press.|
|||Ping, S. (2012) Golden Ratio Estimate of Success Probability Based on One and Only. ArXiv:1207.5198|
|||Tanackov, I., Tepic, J. and Kostelac, M. (2011) The Golden Ratio in Probabilistic and Artificial Intelligence. Tehnickivjesnik/Technical Gazette, 18, 641-647.|
|||Hayata, K. (2014) Golden Distribution of Probabilities. Forma (Letter), 29, 33-40.
|||He, J.-H., Marek-Crnjac, L., et al. (2011) Quantum Golden Mean Entanglement Test as the Signature of the Fractality of Micro Spacetime. Nonlinear Science Letters B, 1, 45-50.|
|||Marek-Crnjac, L. (2006) The Golden Mean in the Topology of Four Manifolds in Conformal Field Theory, in Mathematical Probability Theory and in Cantorian Spacetime. Chaos, Solitons & Fractals, 28, 1113-1118.
|||Jackson, M. (2004) Paradoxes with Dice and Election. In: Tadich, B., Tabias, S., et al., Eds., Towards Excellence in Mathematics; Proceedings of the 4th Annual Conference of the Mathematical Association of Victoria, Monash University, Clayton, Australia, 2004, 208-218.|
|||El Naschie, M.S. (2007) Hilbert Space, Poincaré Dodecahedron and Golden Mean Transfiniteness. Chaos, Solitons & Fractals, 31, 787-793.
|||El Naschie, M.S. (1998) On the Uncertainty of Cantorian Geometry and the Two-Slit Experiment. Chaos, Solitons & Fractals, 19, 517-529.
|||El Naschie, M.S. (2004) A Review of E-Infinity Theory and the Mass Spectrum of High Energy Particle Physics. Chaos, Solitons & Fractals, 19. 209-236.
|||El Naschie, M.S. (2009) The Theory of Cantorian Spacetime and High Energy Particle Physics (An Informal Review). Chaos, Solitons & Fractals, 41, 2635-2646.
|||El Naschie, M.S. (2015) An Exact Mathematical Picture of Quantum Spacetime. Advances in Pure Mathematics, 5, 560-570.
|||El Naschie, M.S. (2016) On a Fractal Version of Witten’s M-Theory. Journal of Astronomy & Astrophysics, 6, 135-144.1-1300213|