Hagy írjam a fizika alapelveit angolul:
To describe Nature the following principles are sufficient and necessary:
Fundamental Principles (FP) of ATOM are
- The particles are localizable objects; neither the position, nor the velocity of particles is ever known precisely.
- The matter is consisting of four kinds of stable particles, the electrons (e), the positrons (p), the protons (P) and the negatively charges protons, the eltons (E); these elementary particles carry two kinds of conserved elementary charges qi = { - e, + e, + e, - e}, and gi = { - g ∙ me, + g ∙ me, + g ∙ mP, - g ∙ mP}, i = e, p, P, E, The stable particles have the elementary masses me, and mP, the elementary electric charges qi = ± e and the elementary gravitational charges gi. The elementary charges are the only properties of the stable elementary particles.
- The gravitation field is fixed by the universal gravitational constant G = g/4∙ π and is generated through the elementary gravitational charges gi similar to the generation of the electromagnetism through elementary electric charges qi.
- Both fundamental fields are continuous objects and they cause the interactions between the particles; the fields propagate with the constant velocity c.
Továbbá:
The fundamental principle of physical description is formulated with the variation principle set in a finite range of the Minkowski-space for the two non-conservative fields and for the four elementary particles carrying two kinds of conserved elementary charges. The fields are continuous objects and propagate with c. Therefore, the Minkowski-space has to be used. The localizable particles can only described with probability densities. In order to derive the equation s of motions, boundary conditions and subsidiary condition are to be applied and the Hamiltonian principle gives the differential equations for the motion of the field and for the particles. For the particles Dirac-like spinors have to be used and with these spinors are constructed the probability current densities. Because of the conserved charges, Lagrange multipliers appear in the equation of the particles. Such formulated theory is also a quantum theory, but only the sources of the fields are quantized; not the energy and not the fields. This quantum theory is the basics of the Atomistic Theory of Matter http://www.atomsz.com. This theory unified the two fundamental interactions; the electromagnetism and the gravity. The actual standard physics don’t use such a quantum theory; it use diverse other conventions which are not unique and which have disastrous consequences. A paradigm shift is the consequence, but the physicists have strong resistance against the change of paradigms yet.
Majd:
The only ground to me to use the Minkowski-space is that both interactions propagate with the natural constant c. In the Minkowski-space space and time are connected in such a way that Lorentz-transformations leave the distance s with
s2 =(c (t1- t2)2 - {(x1 – x2)2 + (y1 – y2)2 + (z1 – z2)2}
invariant (leave the value of s unchanged).
Beside of the invariant s, the stable elementary particles e. p, P and E represent also invariant objects in the Minkowski-space. These invariant particles can also to be described with natural constants. These constants are the both kinds of elementary charges qi, and qi, i= e, p, P, E. The gravitation is universal because the specific gravitational charge g is the same for all four elementary particles: gi = ± g∙mi. The universal gravitational constant is G = g2/4π. With help of the specific gravitational charge g are the elementary gravitational masses of the stable particles me and mP. There exist also two elementary masses! The five natural constants c, e, me, mP and G (or alternatively g) are enough to describe all the physics. In the equation of motions of the particles there appear further constants, the Lagrange multipliers; however these constants are not natural constants. The Lagrange multipliers can be expressed with some of the about mentioned natural constants and with the bound energies of the “stationary ground states”. In the ground states there are no radiations; that means there is no energy lost.
However, neither the positions, nor the velocities of the particles are known ever exactly. These force us the use probability densities for the particles. This is the first principle of the physical description. I have no problems to use mathematically complex numbers; it allow a conformably description of physics in the Minkowski-space. With your last step of factorization process of polynomials, I assume, you try to define exact positions and/or exact velocities. However, it is physically not allowed.
“Why do you use the Minkowski-space instead of Einstein'scomplex spacetime invariant?” I’m not happy with the use of Einstein’s spacetime invariants! The invariants are never complex quantities. Since the interactions are non-conservative interactions and since all the physical systems are non-closed system, I don’t use for instant the relativistic expression of energy- momentum relation for particles E2 = m2c4+ p2c2 as invariant. And I hold also the energy-mass equivalence of Einstein E = mc2 for an error. All expressions for the energy-momentum tensor of Einstein are physically not to be used. Also Poincare’s derivation of the Lorentz-group was physically false, because he didn’t realized that the only invariants in the Minkowski-space are the about mentioned invariants; for instance the elementary charges qi and gi.
Happy and successful New Year 2016.
Kész az anyag atomisztikus elmélete ami a négy stabil elemirészecskére alapul, az elektronra (e), a pozitronra (p) , a protonra (P) és az eltonra (E) alapul. Elton egy negativ töltésü proton (nem antiproton). Ezeknek az elemirészecskéknek kétféle megmaradó elemei töltése van, ami a részecskék közötti nem-konzervativ kölcsönhatást okozzák.
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