International Journal of Physics
ISSN (Print): 2333-4568 ISSN (Online): 2333-4576 Website: http://www.sciepub.com/journal/ijp Editor-in-chief: B.D. Indu
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International Journal of Physics. 2017, 5(1), 16-20
DOI: 10.12691/ijp-5-1-3
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Unified Field Theory - 1. Universal Topology and First Horizon of Quantum Fields

Wei Xu1,

11760 Sunrise Valley Dr. Suite 403, Reston, Virginia 20191, USA

Pub. Date: February 17, 2017

Cite this paper:
Wei Xu. Unified Field Theory - 1. Universal Topology and First Horizon of Quantum Fields. International Journal of Physics. 2017; 5(1):16-20. doi: 10.12691/ijp-5-1-3

Abstract

Evolution from the classical dynamics W=P to the spacetime interwoven W=P+iV of modern physics, this paper demonstrates the yinyang physics of nature law: Universal Topology W=P±iV, that intuitively constitutes YinYang Manifolds and Dual Event Operations. Following the yinyang principle, its First Horizon naturally comes out with the YinYang Energy-State Equilibrium and YinYang Motion Dynamics, which replace the empirical “math law” and give rise to the general quantum fields to concisely include Schrödinger and Klein–Gordon Equations. As a result, this becomes a groundwork in the quest for Unified Physics: the workings of a life streaming of yinyang dynamics ...

Keywords:
unified field theories and models spacetime topology quantum fields in curved spacetime quantum mechanics theory of quantized fields field theory

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References:

[1]  Minkowski 1907-1908, The Fundamental Equations for Electromagnetic Processes in Moving Bodies. pp. 53-111.
 
[2]  Einstein, A. (1905), “Ist die Trägheit eines Körpers von seinem Energieinhalt abhängig?”, Annalen der Physik 18: 639-643.
 
[3]  Sakurai, J. J. (1967). Advanced Quantum Mechanics. Addison Wesley.
 
[4]  Hazewinkel, Michiel, ed. (2001), “Taylor series”, Encyclopedia of Mathematics, Springer.
 
[5]  Hand, L. N.; Finch, J. D. (2008). Analytical Mechanics. Cambridge University Press.
 
[6]  Schrödinger, E. (1926). “An Undulatory Theory of the Mechanics of Atoms and Molecules” (PDF). Physical Review 28 (6): 1049-1070.
 
[7]  Planck, Max (2 June 1920), The Genesis and Present State of Development of the Quantum Theory (Nobel Lecture).