Wednesday, March 5, 2014

Breaking simultaneity in quantum analysis

Quantum scientist like to present the world in our three dimensional view. When the vacuum is stabilized, the world is one dimensional. The best approach is to assume the vacuum is phase stabilized and compute the  solution at nyquist, then reintroduce simultaneity along the axis you choose.
In the case of hydrogen, we just assume simultaneity, spacing circles out from the radios at sub nyquist.  The just spread the phase equilibrium out. Note that as higher energy we are not simultaneous along the radial axis. That is angular momentum. There are fewer static charge samples  and even fewer magnetic samples. The charge quants curve noticeably at Nyquist, and magnetic curve even more at Nyquist. In our three dimensional world, we assume equal sumultaniety in the circles out from the center. Not true. In toward the center, there is less simultaniety and we merge samples.

The way to handle this is to again, complete the longest sequence that include electron velocity. We would notice that static charge field is curving. Then adjust Add in the vacuum samples to take out the curve. Since we are still simultaneous  we can place the vacuum samples along the circle, after we spread out the charge. We get the same picture.

No matter the combinations of electrons and protron, the rule is always the same. Take the largest volume of vacuum that equalizes phase.  The place you proton quants and electron quants, include motion uncertainty by spreading the electrons across multiple samples, and reducing their static and looping fields, equalizing phase across each electron. The add in all the proton and electron static field, include the proton positive charges. Lay our the sequence according to minimum phase. The map to our worlld with additional vacuum samples.

Angular momentum, then, is an artifact of our three dimensional world trying to decompose the simultaneous point world. A point source world is one in which the samples are fired one at a time, in a sequence that minimizes phase.

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