Gravity-Antigravity using new Axioms and Laws

Valentina Markova

Abstract

The modeling is based on a new theoretical basis.The new theory is based on  two new axioms , is built on eight new laws and many consequences. The mathematical basis is described in detail in many previous publications by the same author .  It is well known the Maxuel’s Axiom of Field Theory.It claims that the movement of a closed-loop vector E is always  even: div (rot E) = 0. This model use one (first)  axiom and five laws only .The first  axiom  is fundamental and claims  that the movement of vector E describing an open vortex is always uneven: div (rot E) ≠ 0. When the vortex is in a plane (2D) is obtained  a cross vortex .If div (rot E) >0, the cross vortex accelerates and  it generates as suck in energy  and mass. If div (rot E) <0,the cross vortex  decelerates and  it  emit energy  and mass.When the vortex is in volume (3D) , a longitudinal vortex is obtained.If div (rot E)> 0 the longitudinal vortex  accelerates. If the div (rot E) <0, the longitudinal vortex  decelerates . Moreover, the decelerating cross vortex from 2D is transformed into an accelerating longitudinal vortex into 3D. When the   main cross vortex   is decelerated in 2D, many decelerating   cross vortices are emitted   from the center of   the main vortex  in 2D.If sufficient quantity of  cross vortices  they are accumulated and  transformed in center. A  few  longitudinal  accelerating vortices  in 3D , perpendicular to a 2D is occurred. This a few  longitudinal  accelerating vortices  in 3D are  attracted  each other. The faster is  inserted  into the slower one  bacause of that it   is narrower and has less diameter.So they form so called a Gravity  Funnel.This Gravity Funnel  sucks on below and   shoots to  up and in the same time  is attracts from outside to inside. Obviously this Gravity Funnel  is the basis of generating the antigravity   thrust. The author demonstrates the principle with several animations.

Relevant Publications in Journal of Lasers, Optics & Photonics