Title

The Gem (Gravity-Electro-Magnetism) Theory Of Field Unification And Its Application To Human Flight And Gravity Wave Production And Detection

Abstract

Theoretical progress on the GEM (Gravity-Electro-Magnetism) unification theory is summarized as applied to human flight and dynamically modified gravity fields and waves, as well as progress towards a GEMS (GEMStrong) theory. The GEM theory in the static Newtonian limit is the portion of the Kaluza-Klein action that is quadratic in first derivatives of the metric and in Poynting Flux that appears in the form of a VBE ("Vacuum Bernoulli Equation"). This shows Gravitational energy density to be equated to an EM dynamic pressure that is quadratic in the local Poynting Flux: g2/(2π G) + S 2/(c2 L)= Constant, where g and S are the local gravity and Poynting vector magnitudes, respectively, and where L is the Lagrangian density of the vacuum EM field. The VBE can be used to understand anomalous weight loss reported in gyroscope experiments and to understand possible gravity modification for human flight. The GEM gravity modification theory is extended to predict a VHE (Vacuum Hall Effect). Methods for creating dynamic gravity fields via VHE for production and detection of high frequency gravity fields involve electric quadrapole fields normal to static magnetic fields. In terms of fundamental GEM theory, the important value of the proton to electron mass ratio Rm =1836 in the theory is linked, via the MIT Bag Model, to the value of the reciprocal fine structure constant: Rm= αs/α where αs =13.34 is the asymptotic Strong Force coupling constant. An experiment was performed using this theory that validated the anomalous gyroscope effects predicted by Kosyrev and others, that rotating EM fields appear to create lifting forces. The theory appears to offer insights into enhanced forms of propellant-less propulsion. © 2005 American Institute of Physics.

Publication Date

12-1-2005

Publication Title

AIP Conference Proceedings

Volume

746

Number of Pages

1239-1248

Document Type

Article; Proceedings Paper

Personal Identifier

scopus

DOI Link

https://doi.org/10.1063/1.1867251

Socpus ID

78751690570 (Scopus)

Source API URL

https://api.elsevier.com/content/abstract/scopus_id/78751690570

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