Article citationsMore>>
https://doi.org/10.1103/physrevd.94.086008
Coleman, S. (1988) Aspects of Symmetry: Selected Erice Lectures. Cambridge University Press, Cambridge.
Ariwahjoedi, S., Astuti, V., Kosasih, J., Rovelli, C. and Zen, F. (2016) Statistical Discrete Geometry. arXiv:1607.08629.
Barbero G., J.F. and Perez, A. (2015) Quantum Geometry and Black Holes. arXiv:1501.02963.
Mannheim, P. (2014) PT Symmetry, Conformal Symmetry, and the Metrication of Electromagnetism. arXiv:1407.1820.
Mannheim, P. (2016) Conformal Invariance and the Metrication of the Fundamental Forces. arXiv:1603.08405.
Fabbri, L. (2014) Conformal Standard Model. General Relativity and Gravitation, 44, 3127-3138. arXiv:1107.0466.
has been cited by the following article:
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TITLE:
On the Conformal Unity between Quantum Particles and General Relativity
AUTHORS:
Risto Raitio
KEYWORDS:
Preons, Standard Model, Conformal Symmetry, Torsion, Loop Quantum Gravity, Cosmology, Dark Energy, Dark Matter
JOURNAL NAME:
Open Access Library Journal,
Vol.4 No.1,
January
19,
2017
ABSTRACT: I consider the standard model, together with a preon version of it, to search for unifying principles between quantum particles and general relativity. Argument is given for unified field theory being based on gravitational and electromagnetic interactions alone. Conformal symmetry is introduced in the action of gravity with the Weyl tensor. Electromagnetism is geometrized to conform with gravity. Conformal symmetry is seen to improve quantization in loop quantum gravity. The Einstein-Cartan theory with torsion is analyzed suggesting structure in spacetime below the Cartan scale. A toy model for black hole constituents is proposed. Higgs metastability hints at cyclic conformal cosmology.