Symmetric Theory: Planck’s Particle

doi:10.4236/oalib.1103554

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Open Access Library Journal 4 2017

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Symmetric Theory: Planck’s Particle

DOI: 10.4236/oalib.1103554, PP. 1-17

Giuseppe Azzarello

Subject Areas: Theoretical Physics

Keywords: Planck’s Particle, Magnetic Monopole, Coupling Constants, Superforce, Planck’s Constant, Vacuum Permeability, Zero-Point Energy

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Abstract

The properties of symmetry of the Planck particle will be presented, and its magnetic charge will be extracted. This particle unifies the gravitational force, the electric force and the magnetic force into a single one, referred to as superforce. The physical meaning of permeability of vacuum constants, of, and of zero-point energy will be shown.

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Azzarello, G. (2017). Symmetric Theory: Planck’s Particle. Open Access Library Journal, 4, e3554. doi: http://dx.doi.org/10.4236/oalib.1103554.

References

[1]	Barrow, J.D. (2009) I numeri dell’universo, le costanti di natura e la Teoria del Tutto. Oscar Mondadori.
[2]	Coulomb, C.A. (1788) Memoire sur l’èlectricitè et le magnetisme. Histoire de l’Acadèmie royale des sciences avec le momoires de mathèmatique et de physique tirès des registres de cette Acadèmie, (par l’annè 1785).
[3]	Newton, I. (1687) Philosophiae Naturalis Principia Mathematica. London. https://doi.org/10.5479/sil.52126.39088015628399
[4]	Dirac, P.M.A. (1948) The Theory of Magnetic Poles. Physical Review, 74, 817. https://doi.org/10.1103/PhysRev.74.817
[5]	Shnir, Y. (2005) Magnetic Monopoles. Springer, Berlin. https://doi.org/10.1007/3-540-29082-6
[6]	Comay, E. (2004) A Regular Theory of Magnetic Monopoles and Its Implications. arXiv:physics/0405050.
[7]	Coles, P. and Lucchin, F. (2002) Cosmology, the Origin and Evolution of Cosmic Structure. 2nd Edition, Wiley & Sons, New York.
[8]	Sciama, D.W. (2004) Cosmologia Moderna. Mondadori.
[9]	Amaldi, E. (1980) Fisica generale parte II. Libreria eredi Virgilio Veschi.
[10]	Heaviside, O. (1893) A Gravitational and Electromagnetic Analogy, Part I. The Electrician, 31, 281-282.
[11]	Islam, J.N. (2009) Rotating Fields in General Relativity. Cambridge University Press, Cambridge.
[12]	Brehm, J.J. and Mullin, W.J. (1989) Introduction to the Structure of Matter. John Wiley & Sons, Hoboken, New Jersey.
[13]	Stoney, G.J. (1881) On the Physical Units of Nature. Philosophical Magazine, Series 5.
[14]	Barrow, J.D. (2009) I numeri dell’universo. Mondadori.
[15]	Gilson, J.G. (2004) Newton’s Gravitation Constant G as a Quantum Coupling Constant.
[16]	Weinberg, S. (1972) Gravitation and Cosmology: Principles and Applications of the General Theory of Relativity. Wiley & Sons, New York.
[17]	Gibbons, G.W. (2002) The Maximum Tension Principle in General Relativity. Foundations of Physics, 32. arxiv.org/pdf/hep-th/0210109v1. https://doi.org/10.1023/A:1022370717626
[18]	Massa, C. (1995) Does the Gravitational Constant Increase? Astrophysics and Space Science, 232, 143-148. https://doi.org/10.1007/BF00627550
[19]	Schiller, C. (2006) General Relativity and Cosmology Derived from Principle of Maximum Power or Force. arXiv:physics/0607090v1 [physics.gen-ph]
[20]	D’Inverno, R. (1998) Introducing Einstein’s Relativity. Clarendon Press, Oxford.
[21]	landau, L.D. and Lifsits, E.M. (1985) Teoria dei campi. Editori Riuniti Edizione Mir.
[22]	Planck, M. (1912) über die Begründung des Gesetzes der schwarzen Strahlung. Annalen der Physik, 342, 642-656. https://doi.org/10.1002/andp.19123420403
[23]	Nernst, W. (1916) über einen Versuch, von quantentheoretischen Betrachtungen zur Annahme stetiger Energieanderungen zurückzukehren. Verhandlungen der Deutschen Physikalischen, 18, 83-116.
[24]	Casimir, H.B.G. (1948) On the Attraction between two Perfectly Conducting Plates. Proceedings of the Royal Netherlands Academy of Arts and Sciences, 51, 793-795.

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