Eddies

374(5): The General Planar Orbit of Fluid Gravitation

April 3, 2017

This is found from the gravitational Navier Stokes equation (4), which is a particular case of the general Navier Stokes equation (8). The velocity field is given by Eq. (21) as derived in UFT363. The orbit is worked out entirely in terms of the radial component R sub r of the position element of fluid spacetime, its r derivative and second derivative, and its time derivative. Additional equations are available from fluid dynamics: notably the continuity equation and conservation of angular momentum. These can be developed in future notes, in the meantime model functions can be used. It is already known from Horst’s numerical analysis of yesterday and this morning that a fluid spacetime or aether gives a precessing orbit, a major discovery in my opinion. In this model a planet or object of mass m around an object of mass M moves in a fluid spacetime or aether. The structure of the theory is that of Cartan geometry.”

Always willing to help, it occurred to one of us that it would be possible to detect that fluid spacetime by observing some  difference in the speed of light in beams directed in orthogonal directions. As he was chewing some M&Ms at the time, he suggests calling it the M-M Experiment. He cannot wait to see how it turns out!

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