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A.Einstein, "For us believing in physicists, the distinction between past, present and future is only a stubbornly persistent illusion".

H. Weyl, "We are not surprised that a concrete chunk of nature, taken in its isolated phenomenal existence, challenges our analysis by its inexhaustibility and incompleteness; it is for the sake of completeness, as we have seen, that physics projects what is given onto the background of the possible", (WeH) p. 220.


The phenomenological physical world

About 95% of the universe is about the phenomenon „vacuum“. The same proportion applies to the emptyness between a proton and an electron. The remaining 5% of universe’s vacuum consists roughly of 5% matter, of 25% dark matter, and of 70% dark energy. Nearly all (about 99%) of the 5% matter in the universe is in "plasma state". The presumed existence of „dark matter“ provides the baseline for a physical model of the galaxies‘ spiral shapes phenomenon. The presumed existence of „dark energy“ provides the baseline for a physical model of the cosmic microwave background phenomenon (CMP).

The dominance of the vacuum (in the macro case, as well as in the micro case) in opposite to the small amount of matter is addressed by an appropriate Hilbert space based definition of an „ether/ground state energy“ space, which is „orthogonal“ to a „kinematical energy“ space.

A "kinematical energy" Hilbert space based two-type plasma particle model enables a corresponding MHD based two-type-plasma particles field interaction model governed by three kinds of balance laws: 

1.    conservation of mass  
2.    balance of angular momentum
3.    balance of linear momentum.

The phenomenon of spiral shapes (in the macro case, in our "human being" case, (BaA), (HaG), and, as well as in the micro case) is governed by a balance law of angular momentum.

The phenomenon of the cosmic microwave background radiation is governed by a balance law of linear momentum.

In (ArI) a quaternionic unification of electromagnetism and hydrodynamics is provided. „Employing quaternionic Newton’s law, it is shown that the energy conservation equation is the analog of Lorentz gauge in electromagnetism. This Newton`s law yields directly the Euler equation and other equations governing the fluid motion. With this formalism, the pressure contributes positively to the dynamics of the system in the same way mass does. Hydrodynamics equations are derived from Maxwell`s equations by adopting an electromagnetohydrodynamics analogy.“

In (LeS) the isomorphism between unitaty quaternions and space time rotations is extended to Lorentz boosts. From the transformation properties of two-component spinors a quaternionic representation for the space-time algebra is derived. Additionally, a quaternionic bi-dimensional version of the Dirac equation is derived.


The main changes dressing the emperor

The two main changes to the today's inconsistent quantum field theory and the General Relativity Theory are:

Change 1

the role model of all current types of „elementary particles“ is Dirac's electron. Its conceptual modelling issue is about the fact, that an electron is an „a priori“ existing object independently from Dirac's related radiation theory,(*). This issue is passed on to today's zoo of "elementary particles", which is "required" for just 0,05% of the overall mathematical-physical modelling world.  Basically, the proposed change is about a replacement of the distributional Hilbert space H(-n/2-e), e>0, hosting the Dirac (Delta-) "function", by the (quantum element) Hilbert space H(-1/2). Its related dual (quantum energy) Hilbert space H(1/2) is composed by the standard kinematical Hilbert space H(1) (defined by the Dirichlet integral inner product) and a corresponding orthogonal (ground state energy) sub-space of H(1/2), (**).

Change 2

the space-time model of the GRT is a 3+1 dimensional Riemann manifold equipped with the Einstein metric, (***). Its conceptual modelling issue is about the fact, that the (M,g) structure has no geometric structure at all. It is a purely metric space. The proposed change is basically to replace this purely metric space by appropriate Hilbert scales equipped with corresponding inner products. For the kinematical Hilbert space H(1) this results into a replacement of the metric space (M,g) by a modified Minkowski space, which is newly governed by the complex Lorentz transform, (****), and where the field of complex numbers is replaced by the field of quarternions, (*****).

 
(*)
(FeE): „Dirac‘s theory of radiation is based on a very simple idea; instead of considering an atom and the radiation field with which it interacts as two distinct systems, he treats them as a single system whose energy is the sum of three terms: one representing the energy of the atom, a second representating the electromagnetic energy of the radiation field, and a small term representing the coupling energy of the atom and the radiation field.“

We note that there is a purely electricity field theory based on manifolds, which is called the Mie-Theory, (HeW1).

(**)
(BoD): Bohm’s conception of explicate and implicate orders is based on an „undivided wholeness of modes of observation, instrumentation and theoretical understanding“ considering the difference between a lens and a hologram (a kind of mathematical lens), (BoD).

(***)
The "alignment" tool between the 3+1 dimensional manifold M based field equations and the related Minkowski space based field equations is provided by the comparison theorem building on the following conceptual elements: "electric-magnetic decomposition", "null-decomposition of a Weyl field", "null-structure equations of space-time", "exterior and interior optical functions", "rotation vector fields", (ChD).

(****)
(ArF): „The complex Lorentz transform is the main tool to prove the CPT (Charge-Parity-Time) theorem.  The PT transformations are (physical) geometric transformations, while the C transformation is not. The CPT theorem becomes a purely geometric PT theorem if one restricts to classical tensor theory, quantum tensor theory and quantum spinor theory. The fact that there is a purely geometric PT theorem for quantum field theories suggests that space-time has neither a temporal orientation nor a spatial handedness“. Put simple, there is no  need for a "big bang" "event" in a time-spatial environment, (+).

(*****)
The replacement of the field of complex numbers by the field of quarternions is accompanied by corresponding alignments of affected physical PDE models, e.g. (ArA), (UnA). The link to the Hilbert space based proposed UFT is given by quaternionic inner product spaces V, accompanied by a non-degenerated indefinite inner producton V/V(0), where V(0) denotes the isotropic part of V, (AlD). In the context of the concepts “spin”, “dual turns”, line geometry & kinematics, and “quaternions” we refer to Study’s “movement indicator”, (BlW)§58.

The perhaps primary application of quaternions is the quaternion rotation operator. This is a special quaternion triple-product (unit quaternions and rotating imaginary vector) competing with the conventional (Euler) matrix rotation operator. The quaternion rotation operator can be interpreted as a frame or a point-set rotation, (KuJ). Its outstanding advantages compared to the Euler geometry are

- the axes of rotation and angles of rotation are independent from the underlying coordinate system and directly readable

- there is no need to to take care about the sequencing of the rotary axes.

   

Braun, K., Quaternionic Hilbert spaces and the quarternion rotation operator

 

                                  August 7, 2022 update: pp. 3-4


The Hilbert scale framework in a quaternionic setting also puts the spot on the proposed Kummer function based zeta-function theory, on a related (distribution valued complex functions based) verification of the Berry-Keating conjecture, (BrK2), (PeB), §15, and, on the Kummer conjecture, (HaH), (KuE5), in a Hurwitz quaternionic setting, (BrK2), (++).

In the context of ergodic theory (physically speaking, the theory of the course of movements of mechanical systems; mathematically speaking, the solutions of corresponding hyperbolic PDE, (+++)) we note that the point spectrum of a flow builds an additive modul, (HoE) S. 27. For every complete area withconstant negativ curvature and finite surface the geodesic flow is metrically transitiv, (HoE) S. 69. This main theorem can be reformulated as a theorem over Fuchsian groups, (HoE) S. 72. In this context we note that a Fuchsian group Fcan be mapped to a quaternion algebra, which contains F in its 1-norm-subgroup,(MaC).


(+)
The root of evil is sometimes called the "problem of time", (Callender C., TheOxford Handbook of Philosophy of Time, Oxford University Press, Oxford, 2013). In the proposed variational MHD-based unified plasma-quantum-gravity field theory classical PDEare interpreted as approximation to underlying two layers of variational PDO equations based on two "layers" of (energy) Hilbert spaces accompanied by two "energetical" inner products. Those layers are accompanied by two models of "time" characterizing two borderlines A & B between (1) the mathematical (action-free) ground state energy "world", (2) themathematical-physical (cosmic time) "world", and (3) Husserl's mathematical-phenomenological (internal time-consciousness) view of the world.

In the context of Husserl's "ideas of a pure phenomenology" and philosophy as an "essence (eidetic) science", (like pure logic, pure mathematics, space and time theory, kinematics, etc. ((HuE1) p. 20)), the crossing between the two layers A and B might be interpreted as "transcendental reduction" resp. "eidetic reduction", (HuE1).

With respect to the "problem of time" dispute between A. Einstein and H. Bergson resulting into the famous "twin paradox" formulation and its resolution by H. Bergson we refer to (BeH).

(++)
the theory of algebraic integrals containing the square root of functions of 1st or 2nd order are built on trigonometric functions and the irrelated circle functions. The theory of algebraic integrals containing the square root of functions of 3rd or 4th order (e.g. the Fagnano-integral to calculate the value of Gamma(1/4)) are built on elliptic functions and their related elliptic integrals. The conceptual new property, which is unique in the whole area of elementary functions, is the double-periodicity of the elliptic functions. This property, in combination with the change from the set of zeros of the trigonometric functions to the set of the +/- zeros of the Kummer function (accompanied by a change from harmonic Fourier series to non-harmonic Fourier series, cohomology groups interpreted as homology groups of negative order, (NeJ), and the H(1/2) space as first cohomology, (NaS)), puts the spot on the concept of the n-Kummer-Galois extension of the field containing a primitive nth root of unity and the Kummer’s prime number irregularity theorem in the context of cyclotomic fields, zeta-function values, the Kummer pairing and on the Kummer conjecture, (HaH), (KuE5). The new elements from the proposed Kummer function based zeta function theory are given by the decomposition of the li(x) function resp. the unit circle into a sum of two number distribution function resp. into two-semicircles.

(+++)
the role model for elliptic PDE is the Laplace equation; the role model for hyperbolic PDE is the (time-symmetrical) wave equation; the role model for parabolic PDE is the heat equation with its underlying positive time arrow. We note that the three characterizing "discriminants" for those three PDE types describe elliptic, hyperbolic and linear curves. Applying those types to model physical phenomena means different impact on the the corresponding degree of complexity: parabolic PDEs show reduced mathematical complexity compared to corresponding elliptic or hyperbolic PDEs. Hyperbolic PDEs (governed by the real proper Lorentz transformation) show a mathematical complexity increase compared to corresponding elliptic PDE with respect to the underlying domains (e.g. Minkowski space-time in R(4) vs. simple connected domains in R(4)).

A famous example for different interpretations as a consequence of the imbalances of physical phenomena complexity vs. mathematical modelling complexity (restricted to only hyperbolic PDE) are the different opinions of W. Ritz and A. Einstein (Physikalische Zeitschrift 10 (1909) 323-324) regarding the radiation problem with the possible different mathematical forms modelling "an electromagnetic process remaining restricted to a finite space", and correspondingly different required physical modelling assumptions (one of the roots of the second law (the mathematician) vs. due to reasons of probability (the physicist)).

The real Lorentz group has to do with the symmetry of vectors (tensors). The "covering group" of the real Lorentz group is SL(2,C), having to do with that of spinors.

The complex, homogeneous Lorentz group, L(C), (the set of (4x4) complex matrices) has two connected components L(+,C) and L(-,C), where L(+,C) is the only sub-group of L(C). It leaves the complex Minkowski scalar product z*z invariant, without complex conjugation of one of the complex four-vectors z. We note that there is a two-to-one homomorphism from SL(2,C) x SL(2,C) onto L(+,C), which is a proper Lorentz transform, (WiD).

For quaternionic Lorentz group representations in relation to the Dirac equation we refer to (LeS).

For quaternionic analysis and elliptic boundary value problems we refer to (GuK).

The proposed Hilbert scale & MHD based unified quantum, plasma and gravity field model is built on variational elliptic PDE with domains governed by the Hurwitz quaternions and an "extended" H(1/2) energy inner product, which are approximated by variational hyperbolic PDE governed by a "coarse grained" (i.e. compactly embedded) kinematical H(1) approximation energy sub-Hilbert space of H(1/2) and the complex Lorentz sub-group L(+,C). Thereby, the two-to-one homomorphism from SL(2,C) x SL(2,C) onto L(+,C) is in line with the proposed "two-plasma-component-model" H(1) decomposition.


Braun K., A Hilbert scale and MHD based unified plasma, quantum and gravity field theory


                                                 Feb 4, 2022
 

Braun K., A geometric Hilbert scale based integrated gravity and quantum field model, Dec 2021 overview


                                                Dec 19, 2021


related 2018-2021 papers:
 

Braun K., A geometric Hilbert scale based Mie electricity field theory accompanied by a complementary 0-point energy space, Sept 2021


 

Braun K., A validation approach of the proposed gravity and quantum field model, June 2021


 

Braun K., A geometric Hilbert scale based gravity and quantum field model, the modelling landscape, May 2021
 
 

Braun K., A geometric gravity and quantum field model, some royal road markers, April 2021

                                        

                

Braun K., A Hilbert scale based integrated gravity and quantum field model, Dec 18, 2021 overview


                                                 Dec 2021

          

Braun K., consolidated homepage, YME vs. Mie theory, Jan 2022


                                                  Jan 2022

                          

Braun K., Looking back, part C, (C1)-(C8)


                                           January 11, 2021

                         

Braun K., Looking back, part B, (B1)-(B17)


                                          December 2, 2020

                            

Braun K., 3D-NSE, YME, GUT solutions


                                              July 31, 2019
       

Braun K., A distributional Hilbert space framework to prove the Landau damping phenomenon


                                             August 2018

           

Braun K., An integrated electro-magnetic plasma field model


                                               Sept 2018