Note 434(2): The de Broglie Wave Particle Dualism in m Space

Note 434(2): The de Broglie Wave Particle Dualism in m Space

Thanks to Gareth Evans and Horst Eckart for checking this note. Here is Note 434(1). Concerning the calculation of dr1 / dr, it is carried out in exactly the same way as in UFT417, Eq. (16). You checked this result with computer algebra. It is of the type y = x / f(x), so dy/dx = (f(x) – xf'(x)) / f(x) squared. This gives the result that p = h bar kappa develops new structure in m space. The next step is to repeat this calculation for E = h bar omega.

On Sat, Mar 16, 2019 at 6:36 PM Horst Eckardt <mail> wrote:

PS: where is note 434(1) ?

Horst

Am 16.03.2019 um 13:18 schrieb Myron Evans:

Note 434(2): The de Broglie Wave Particle Dualism in m Space

This note shows that the fundamental equation of de Broglie wave particle dualism, p = h bar kappa is changed completely in m space and takes on a rich structure made of momenta eigenvalues, each corresponding to an elementary particle. Under condition (26) the momenta become infinite. In general physics in my space is a much richer subject than in flat space (m(r) = 1). Schroedinger quantization in m space is changed fundamentally to Eq. (10). Similar considerations will apply to rotational physics, introducing a new subject of m space quantum mechanics and m space particle physics. Time in m space is changed from t to (m(r) power half) t, so Planck quantization E = h bar omega will also be affected.

a434thpapernotes1.pdf

a434thpapernotes2.pdf

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