The proposed Unified Field Theory (UFT) provides
an all-encompassing theory, where physical models of different physical areas
are no longer decoupled and differently scaled according to their different
levels of granularity. It is governed by two types of energy, the today’s mechanical
energy (i.e., kinetic and potential energy) and a newly proposed dynamic
energy, (which is in line with Planck's dynamic type of physical law,
(PlM)), and a corresponding hierarchy of dynamic quanta accompanied by an appropriately defined scheme of quanta numbers.
The essential mathematical concept is a Krein space framework. The crucial differentiator between Krein
and Hilbert spaces is the concept of an indefinite metric/norm. The counterpart of the definite norm induced by the inner product of a Hilbert space in a Krein space framework is given by the concept of an intrinsic
self-adjoint "potential" operator (the fundamental J-inner product, e.g. (BoJ) p. 120 ff). It enables the definition of quantum type specific "dynamic energy" inner products for each considered quanta energy system.
Note: An
indefinite metric in a Hilbert space is one of the unconventional
features of Heisenberg's "Introduction to the Unified Field Theory of
Elementary Particles", (HeW). The conceptual design of the proposed quanta
scheme follows the "principle of Nature" thatany
"action" always requires a potential difference or a
"pressure", i.e., there is no physical action, just because there is
energy or a potential. Technically speaking, all Krein space based particle
types are elements of the same underlying baseline Hilbert space; however, they
are accompanied by different (energetical) indefinite & definite inner products and norms
(functionals) for each considered quanta.
Scope & conceptual design elements The scope of the Unified Field Theory (UFT) includes the scope of the three (independent, just "linked because they seem to have similar characteristics", (GlJ) p. 433) quantum field theories (strong interactions, weak interactions, and electromagnetics), the scope of both relativity theories, the plasma physics, and the solid state physics.
The Hilbert space theory provides the mathematical framework of quantum mechanics. The extended Krein space theory (accompanied by the concepts of an indefinite norm and an intrinsic self adjoint potential operator) provides the mathematical framework of the proposed UFT. While quantum mechanics is governed by the physical concept of mechanical energy, the proposed quanta dynamics is governed by mechanical and (newly) dynamic energy. There are several dynamic quanta systems, which are governed by an appropriately defined deductive quanta numbers scheme. The characteristic of this scheme is an implicate (in the sense of D. Bohm, (BoD1)) "potential difference" between the related (particle,anti-particle)-components per each quanta system.
The real Lorentz group L has three subgroups
(orthochronous, proper, orthochorous). Associated with the restricted
Lorentz group is the group of 2x2 complex matrices of determinant one,
which is denoted by SL(2,C). It is isomophic to the symmetry group
SU(2) and
the unit quaternions S(3). In SMEP the group SU(2) describes
the weak force interaction with 3 bosons W(+), W(-), Z, the characteristic of the
beta-decay process. It also plays a key
role in the special relativity theory accompanied by the concept of the Minkowski space.
The perhaps primary application of quaternions
is the quaternion rotation operator addressing the „translation-rotation“
(linear and angular rotation) „permutation“ requirement. This is a special
quaternion triple-product (unit quaternions and rotating imaginary vector)
competing with the conventional (Euler) matrix rotation operator, (BrK0) p. 47, (KuJ).
The complex
Lorentz group L(C) is associated with SU(2)xSU(2). It is essential in
the proof of the PCT theorem, (StR) p. 13. It is also the (hidden)
symmetry group of the
Coulomb problem, (BrK0) p. 58 ff., (BrK14) pp. 14, 28. In contrast to
the real Lorentz group the complex Lorentz group has just two connected (!)
components accompanied by a multiplication law for pairs of 2x2
matrices, (StR) p. 14. It is supposed to govern the conservation of
energy laws of the dynamic quanta systems, (BrK0) p. 31.
There are two a priori 2-component mathematical dynamic quanta systems: the a priori dynamic electrino-positrino based ground state quanta system and the electron-positron based perfect
plasma quanta system, see also (BrK14) p. 26. The most aggregated Krein space based energetical systems built from those a priori systems are three types of explicate 1-component mechanical atomic nucleus quanta systems accompanied by implicate 1-component dynamic quanta systems (ref. Bohm's "wholeness and implicate & explicate orders", (BoD1)). They may be interpreted as conductor, semi-conductor, and non-conductor atomic nucleus types.
The UFT provides a
- 2-component a priori dynamic "Ground State" Model (GSM) - 2-component a priori dynamic "Perfect Plasma" Model (PPM) - 2-component mechanical "Electro-Magnetic" Maxwell-Mie Theory (EMT) - 1-component mechanical "Dirac 2.0 Atomic Nucleus" Theory (ANT) - 1-component Dynamic Fluid Theory (DFT).
It enables
- a well-posed
3D-NSE system for dynamic fluid particles by the DFT - an enhanced Schrödinger 2.0 operator by the Riesz transform - a "Yang-Mills" SU(2)-invariance for Dirac 2.0 (mass) particles by the ANT - an integrated Plasma Dynamics Theory (PDT).
The symmetry break down from the complex Lorentz group to the (real) restricted Lorentz group may become a characteristic
of the transformation process from purely dynamic energy governed 2-component quanta systems to
1-component quanta systems accompanied by the concept of mechanical energy and the Minkowski space-time continuum.
GSM & PPM The a priori 2-component dynamic "Ground State" Model (GSM) and the a priori dynamic "Perfect Plasma" Model (PPM) may be interpreted as an Einstein-Lorentz
ether, (EiA5). We note that
- the CMBR (currently interpreted as the "echo of the early universe", (LaM)) is an essential element of theoretical and observational cosmology and one of the foundation stones of the big bang models; to the author's humble opinion, those models are extremely unrealistic because they are based on an a priori required mathematical singularity which caused for whatever reason the biggest explosion ever, (PeR) p. 444
- there are currently two different (!) physical explanation models for the Landau damping phenomenon depending from the considered
linear or nonlinear mathematical model, (BrK14) p. 18.
The cosmic microwave background
radiation (CMBR) and the Landau damping phenomena may be interpreted as
characteristic (echo) phenomena of the EMT electroton-magneton quanta
creation process from the GSM and PPM, see also (BrK14) p. 26.
EMT Quote: „…. light beams must have electric stationary
components in the direction of the wave front normal, and that consequently
there must be stationary electric potential differences between different
points along the beam; and that there must be also a stationary magnetic field
in the beam of light with potential differences. Hence, the light beam must
have a magnetizing effect, and the charge of a magnet should be changed by
light“, (EhF1).
We note that the mechanical energy based 2-component electro-magnetic quanta field of the EMT is in line with the "photopheresis" phenomenon discovered by F. Ehrenhaft, (BrJ), (BrK14) p. 22.
ANT In
the ANT the term "Dirac 2.0 Atomic Nucleus" is chosen to anticipate
that Dirac's single mechanical energy system is extended to a mechanical
x dynamic energy system concept.
Quote: "Dirac's theory of radiation
is based on a very simple idea; he treats an atom and the radiation
field as a single system whose energy is the sum of three terms: one
representing the energy of the atom, a second representing the
electromagnetic energy of the radiation field, and a small term
representing the coupling energy of the atom and the radiation field", (FeE).
The Dirac 2.0 systems provide a mechanical atomic nucleus concept accompanied by the concept of implicate dynamic quanta (in the sense of D. Bohm, (BoD1)). The potential between this implicate quanta pair defines the dynamic energy of the mechanical atomic nucleus. Those systems neither require the hypothesis
of an electron spin nor the existence of the fine structure constant.
The ANT puts the spot on the "Mach 2.0" principle as proposed in (UnA1) p. 156,
which is essentially the Mach principle + Dirac's two large number
hypotheses in the context of his "new basis for cosmology", (DiP2).
DFT The Krein space based 1-component mechanical atomic
nucleus quanta systems can be further aggregated/approximated by the
purely Hilbert (energy) space system H(1/2), which is an extension of
the variational mechanical standard energy Hilbert space H(1). The
mechanical H(1) energy system is the domain of the Friedrichs extension
of the Laplacian (potential) operator accompanied by the domain H(2),
i.e. it is an extension of the classical mechanical standard energy
Hilbert space H(2).
The standard Hilbert space systems H(1) resp.
H(2) provides the variational resp. the classical framework for
classical and quantum mechanics accompanied by the concept of Fourier
waves. The complementary sub-space of the extended H(1/2) Hilbert space
with respect to the H(1)-norm provides an appropriate Hilbert space
based framework for quantum dynamics accompanied by the concept of
wavelets. The latter ones may be interpreted as "a mathematical
microscope", (BrK0) p. 19, (BrK14) p. 37, (HoM) 1.2.
Physically speaking, the compact embedding of H(1) into H(1/2) addresses "the
problem of matter in the Maxwell equations, by explaining why the field
possesses a granular structure and why the knots of energy remain
intact in spite of the back-and-forth flux of (mechanical!) energy and
momentum", (WeH) p. 171.
PDT Plasma is that state
of matter in which the atoms or molecules are found in an ionized state. The number of neutral particles (atomes or molecules) in a gas is
irrelevant for the definition of a plasma. The number of positively and
negatively charged particles per considered volume element may be arbitrarily
small oder arbitrarily large, but both numbers need to be approximately
identical (in order to have no internal macroscopic electrostatic fields. The
interactions of electrons and ions are determined by long-range electrical
forces. Plasma physics is about classical statistical fluid
mechanics and classical fluid dynamics. The underlying related mathematical
models are grouped by different physical application areas resp. chosen
mathematical tools accompanied by correspondingly defined different types of
„plasma matter gases“,(BrK0) p. 60.
Note: The a priori GSM & PPM in combination with the EMT, ANT and DFT enable an integrated Plasma Dynamics Theory (PDT) avoiding the concept of a Debye sphere.