## Eq. (2) of Note 356(5)

I agree with Eq. (10) of the protocol, it would be interesting to graph this, if feasible, in spherical polar coordinates in three dimensional colour plots. In general the electric field strength E and the magnetic flux density B of any material will induce very interesting and entirely novel velocity flows in the spacetime or aether. This is your idea and it works fine. It is the direct logical result of ECE2 unified field theory as you know. The flows induced in the aether in this way will have a back effect on the circuit. For each type of boundary condition the induced aether flow will be different. The other type of theory uses the vorticity equation to produce aether turbulence, which may be transferred to a circuit as in UFT311 and in recent observations by Osamu Ide. There is already a great deal of international interest in this work as can be seen from the early morning reports.

To: EMyrone@aol.com

Sent: 29/08/2016 17:11:18 GMT Daylight Time

Subj: Re: Eq. (2) of Note 356(5)The eq. (2) can be solved. It is the same eq. as I sent over for note 356(4). However, this equation only follows for

v_r = v_r(r)

v_theta = 0

v_phi = 0If more dependencies are allowed and all components are different from zero, there are more complicated equations as can be seen from vector equation o10 in the protocol. If all components of v have only an r dependence, the result is o12, not much simpler. Only with zero components v_theta and v_phi the equ. (2) of the note follows, see o15. There is an analytic solution o19/o20, but it is not a pure Coulomb potential, as already discussed with note 356(4). We have to interpret this result in any way, or the operator (v*grad) has to be calculated in any other way. However it seems not to be used in VAPS execpt for cartesian coordinates.

Horst

Am 29.08.2016 um 09:45 schrieb EMyrone:

Can this equation be solved with a partial differential equation package? It looks like an interesting non linear differential equation to which there may be an analytical solution. In order to eliminate the complexities of the spherical polar coordinate system I can set up the problem in the Cartesian system. In any case we have already proven the method of UFT356 and there is a great deal of interest in the latest UFT papers as you can see from this morning’s report. It would be interesting to model boundary conditions on an actual circuit such as that of UFT311, which is the ultimate aim of the research.

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