But if you could sense the field ( e.g. capacitor plate ), you could send information at infinite speed -- what's wrong with that analysis?
From: Daniel Rocha [mailto:danieldi...@gmail.com] Sent: Saturday, February 15, 2014 1:22 PM To: John Milstone Subject: Re: [Vo]:tentative evidence that a coulomb field propagates rigidly Indeed, in the Coulomb gauge, the electrical field propagates with an infinite speed. This is known for over a century. But this ignores what happens magnetic field. In the end, the propagation of energy happens at c. 2014-02-15 13:04 GMT-02:00 <fznidar...@aol.com>: I produced something like that from my model. My model taken to the extreme states that electrons are rigid. One of my theorems is, "Electrons do not bounce." They cannot bounce their energy away and all wind up in the lowest energy state. This is the root cause of Fermi statistics. The quantum behavior of the electron can be explained by this interaction. They interact through a process of elastic failure. Elastic failure is a classical property. Electrons don't bounce and interact through a process of elastic failure; sort of like a thrown egg. Impedance matched systems do not bounce. Electrons propagate through channels of matching impedance. The quantification of the velocity of the process (1,094,000 meters per second) produced the quantum condition. That's what I got out of cold fusion. Frank Z -- Daniel Rocha - RJ danieldi...@gmail.com --- This email is free from viruses and malware because avast! Antivirus protection is active. http://www.avast.com
