In a message dated 2/24/05 12:01:10 PM Pacific Standard Time, [EMAIL PROTECTED] writes:
this is mostly new from the BLP site.
http://www.blacklightpower.com/pdf/Theory%20Pres%20020905%20std%202.pdf
The above link discusses the Unified Maxwell Theory based on Relativity which is very helpful, but we should also consider the comments below by Konstantine Meyl, in his book Scalar Waves about Unified Theory:
Scalar Waves by Konstantine Meyl, Pg. 530 to 566., 2003 Indel:
"Demokrit (460-370 BC) equated the vortex concept with "Law of nature "= the first attempt to formulate a unified physics.
Comparison of Faraday's Universal Theory of Objectivity to the special case of Maxwell's Theory and Relativity:
Faraday's Universal Theory of Objectivity based on the law of unipolar induction
1. The Farady approach is universal
2. It reveals a physical principle
3. The field is the cause for the particles
4. Principles of causality are preserved.
5. Particles are probably field configurations
6. Quanta can be calculated as field vortices without any hypothesis.
7. All quantum properties can be calculated likewise.
8. Potential vortices form electrical field vortices. The E field is a source free vortex field.
9. Field vortices carry momentum and form a scalar wave.
10. Longitudinal wave with arbitrary velocity of propagation v.
Maxwell Theory and Relativity:
1. Maxwell's field equations can be derived.
2. The field equations describe only a special case
3. Particle and field are cause and effect at the same time.
4. Violation of the rules of causality.
5. Particle consist of hypothetic subparticles.
6. Quark-hypothesis must replace missing calculation.
7. Sorting and systematizing of the properties of the standard model.
8. The electric field is irrotational. The E field is an irrotational field of sources
9.Electromagnetic wave is a transverse wave.
10. Constant propagation with the speed of light c.
According to the Maxwell theory there exists no vortixes of the electric field (no potential vortices) and therefore no scalar waves. ...
For the description of the losses the Maxwell theory on the one hand only offers field vortices and those only in the conductive medium. On the other hand do the dielectric losses occure in the nonconductor and in the air. In conductive materials vortex fields occur, in the insulator however the fields are irrotational. That isn't possible, since at the transition from the conductor to the insulator the laws of refraction are valid and these require continuity! Hence a failure of the Maxwell theory will occur in the dielectric. As a consequence the existence of vortex fields in the dielectric, so called potential vortices should be required!
The Maxwell equations on the one hand dictate that as the reason for a wave damping only field vortices should be considered. On the other hand the same laws merely describe eddy currents, which can only occur in the electrically conducting parts of the antenna. On the one hand the field vortex interpretations makes it possible to explain the noise of the antenna perfectly ... In field physics on the other hand is missing a useful description of electrical field vortices in a dielectric, which could found the noise signal.
According to Maxwell Theory:
Longitudinal waves run in the direction of a field pointer.
The field pointer oscillates, the vector of velocity oscillates along!
At relativistic velocities field vortices are subject to the Lorentz contraction.
The faster the oscillating vortex is on its way, the smaller it gets.
The vortex permanently changes its diameter.
With the diameter the wavelength decreases.
The swirl velocity is constant (=speed of light c).
The eigenfrequency of the vortex oscillates with opposite phase to the wavelength.
The vortex acts as a frequency converter!
The measurable mixture of frequencies is called noise.
The antenna noise corresponds to the antenna losses!
Mathematically seen the damping- resp. vortex according to Maxwell can be put equal to the scalar wave term according to Laplace.
Physically seen the generated field vortices form and found a scalar wave. ..
In the case of the antenna example the vortex part amounts to 20 percent, then that's tantamount to 20 percent scalar wave part, resp. 20 percent noise. The scalar wave part constitutes with regard to the Hertzian useful wave something like an error term in the wave equation. The part definitely is to big, as that it might be equal to zero. Even so all error considerations in textbooks is missing, if the scalar wave term is assumed to be zero. That violates all rules of physics and of taught scientific methodism. ..
If an antenna on the one hand produces field vortices and as a consequence eddy losses and on the other hand dielectric losses, then we can assume that besides the eddy currents in the conductor also vortices in the dielectric must exist.
Potential vortices explain div. phenomena in the dielectric:
1. The noise is not longer factored out of the field theory.
2. The scalar (noise) part in the wave equation no longer has to be put to 0 (div E not = 0).
3. The wave descriptions according to Maxwell and according to Laplace are consistent and free of contradiction.
4. The dielectric losses of an antenna can be found physically and even can be calculated with the wave equation.
5. Also the dielectric losses of a capacitor are eddy losses ( and not a defect in material of the insulating material).
6. The capacitor losses correspond to a generated noise power.
7. The dielectric constant e (epsilon) doesn't have to be written down as until now to give reasons for the occurring losses, and so the inner contradiction is solved, which is hidden in a complex constant. One should only remember the definition of the speed of light c= 1/square root (e u). and the insurmountable problems in the textbooks which are brought by a complex e.
8. The field lines point from one capacitor plate to the other plate. If one plate radiates as a transmitter and the other plate functions as a receiver, then the field propagation takes place in the direction of the electric field pointer and that again is the condition for a longitudinal wave.
9. The capacitor field mediates dielectric field vortices, which following the field lines found a scalar wave because of their scalar nature.
10. As an inhabitant of a dielectric between tow capacitor plates (earth and ionosphere) also man is a product of these field vortices.
11. Scalar waves can be modulated more dimensionally and be used as a carrier of information, as Prof. Sheldrake has proven with his proof of the existence of morphogenetic fields.
Mathematical description of a wave by the inhomogenous Laplace equation:
(Laplace Operator) Triangle E * c^2= (transverse radio wave) -rot rot E * c^2 + (Longitudinal Scalar Wave) grad div E * c^2 = (Wave) d^2E/d^2t where d^2 = the second derivative operator, c = the speed of light.
Field equation of a damped transverse wave:
-rot rot E * c^2 (transverse) = d^2E/dt^2 + 1/tau (wave) * dE/dt (vortex damping) where tau= relaxation time = epsilon(e)/sigma and dielectric displacement D = e * E and rot H = e * (E/tau + d^2E/dt^2) and B = u * H, with u * e = 1/c^2.
The complete Field equations with time constants tau sub 1 and tau sub 2 of the respective field vortex by the extension of the law of induction for vortices of the electric field (potential vortices):
Completely extended law of induction with B = u * H
rot E = - dB/dt - B/tau sub 2 = - u (dH/dt + h/tau sub 2)
and the well known law of Ampere (with D = e * E)"
rot H = dD/dt + D/tau sub 1 = e (dE/dt + E/tau sub 2)
Fundemntal Field Equation:
-c^2 rot rot E = d^2 E/dt^2 + (1/tau sub 1) * dE/dt + (1/tau sup 2) * dE/dt + E/tau sub 1 tau sub 2 + eddy current + potantial vortex + 1/U.
Scalar Waves by Konstantine Meyl, Pg. 530 to 566., 2003 Indell"
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