The Second Hamilton Equation of Motion in Quantum Mechanics

Feed: Dr. Myron Evans
Posted on: Sunday, March 06, 2011 5:46 AM
Author: metric345
Subject: The Second Hamilton Equation of Motion in Quantum Mechanics

This is derived using the tautology d<p> / dp = 0, and the proof will be given in the next note before finally discussing the effect of relativity on the Heisenberg uncertainty principle. The latter is irrational and unscientific, so in a sense, logic cannot cure irrationality. This is why the tedious arguments about the interpretation of quantum mechanics have dragged on endlessly. However some details will be given for the final note of UFT 175. These notes will also be used for “The Fermion Equation” with tables of expectation values by Horst Eckardt’s computer algebra, tables that refute the Heisenberg uncertainty principle completely, thoroughly, and for the first time. The refutation of the uncertainty principle makes no difference at all to science because it is in fact unusable, being non-Baconian. Experiments that claim to verify the uncertainty principle will fail if studied in enough depth and with enough care. The product of the root mean square deviations from the mean of x and p, denoted delta x delta p, is a statistical property. This was Schroedinger’s original interpretation. The Langevin equation for example is a statistical equation describing the Brownian motion, no one has ever claimed that Brownian motion is “unknowable”. It was discovered by Robert Brown, a botanist and another of my Civil List predecessors. It was first explained by Einstein in 1905, and shortly thereafter by Langevin.

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