Definition: Einstein’s field equations

Einstein field equations (EFE), originally [13] published [14] without the extra “cosmological” term L ´ g_µv may be written in the form

where G_µv is the Einsteinian tensor, T_µv is the stress-energy tensor of matter (still a field devoid of any geometrical significance), R_µv denotes the Ricci tensor (the curvature of space), R denotes the Ricci scalar (the trace of the Ricci tensor), L denotes the cosmological “constant” and g_µv denotes the metric tensor (a 4 × 4 matrix) and where p is Archimedes’ constant (p = 3.141 592 653 589 793 238 462 643 383 279 502 884 197 169 399 375 105 820 9∙∙∙), g is Newton’s gravitational “constant” and the speed of light in vacuum is c = 299 792 458 [m/s] in S. I. units.

Scholium.

The stress-energy tensor T_µv, still a tensor devoid of any geometrical significance, contains all forms of energy and momentum which includes all matter present but of course any electromagnetic radiation too. Originally, Einstein’s universe was spatially closed and finite. In 1917, Albert Einstein modified his own field equations and inserted the cosmological constant L (denoted by the Greek capital letter lambda) into his theory of general relativity in order to force his field equations to predict a stationary universe.

“Ich komme nämlich zu der Meinung, daß die von mir bisher vertretenen Feldglei- chungen der Gravitation noch einer kleinen Modifikation bedürfen…” [15] .

By the time, it became clear that the universe was expanding instead of being static and Einstein abandoned the cosmological constant L. “Historically the term containing the “cosmological constant” λ was introduced into the field equations in order to enable us to account theoretically for the existence of a finite mean density in a static universe. It now appears that in the dynamical case this end can be reached without the introduction of λ” [16] . But lately, Einstein’s cosmological constant is revived by scientists to explain a mysterious force counteracting gravity called dark energy. In this context it is important to note that neither Newton’s gravitational “constant” big G [17] [18] nor Einstein’s cosmological constant L [19] is a constant.

Definition: General tensors

Independently of the tensors of the theory of general relativity, we introduce by definition the following covariant second rank tensors of preliminary unknown structure whose properties we leave undetermined as well. We define the following covariant second rank tensors of yet unknown structure as

while the tensors A_µv, B_µv, C_µv, D_µv may equally denote something like the four basic fields of nature. Especially, the Ricci tensor R_µv itself can be decomposed in many different ways. In the following of this publication we define the following relationships. We decompose the Ricci tensor R_µv by definition as

to assure that both gravitation and electromagnetism is geometrized simultaneously. Since everything is expressed in terms of curvature tensor, the electromagnetic field itself is completely geometrized from the beginning. By the following definition, the electromagnetic stress energy tensor, denoted as B_µv, appears as part of Einstein’s stress- energy tensor, while the tensor A_µv, also part of curvature, denotes the stress energy tensor of “ordinary” matter. Thus far, we obtain

Scholium.

By this definition, we are following Vranceanu in his claim that the energy tensor T_kl can be treated as the sum of two tensors one of which is due to the electromagnetic field.

“On peut aussi supposer que le tenseur d’énergie T_kl soit la somme de deux tenseurs dont un dû au champ électromagnétique…” [20] .

In English:

“One can also assume that the energy tensor T_kl be the sum of two tensors one of which is due to the electromagnetic field”.

In other words, the stress-energy tensor of the electromagnetic field B_µv is equivalent to the portion of the stress-energy tensor of energy which is determined by the stress energy tensor of the electromagnetic field B_µv itself. The stress-energy tensor T_µv has the unit of energy density [J/m³] or pressure [N/m²] which are actually the same unit. In the International System of Units the joule is a derived unit of energy and is defined as 1[J] = 1[kg×m²/s²] = [N×m] while 1[N] = 1[kg×m/s²] = 1[J/m] denotes the unit of force. Figure 2 may illustrate the relationship above in some more detail.

Einstein himself was demanding something similar.

“Wir unterscheiden im folgenden zwischen “Gravitationsfeld” und “Materie” in dem Sinne, daß alles außer dem Gravitationsfeld als “Materie” bezeichnet wird, also nicht nur die “Materie” im üblichen Sinne, sondern auch das elektromagnetische Feld.” [14]

We define an anti tensor [2] of Einstein’s stress energy tensor T_µv, as

while Einstein’s tensor G_µv is defined by

where A_µv is the known the stress energy tensor of “ordinary” matter.

Scholium.

One consequence of the definition before is that the tensor of ordinary matter A_µv becomes a joint tensor since the same tensor is a determining part of the Einstein’s stress energy tensor and equally a determining part of Einsteinian tensor G_µv. In probability theory, such a tensor would represent a joint distribution function. The Ricci scalar curvature R[1/m²] is a contraction of the Ricci tensor R_µv[1/m²]. The Ricci tensor itself is a contraction of the Riemann tensor while a contraction as such doesn’t change the units.

Finally, we define an anti-tensor G_µv of Einsteinian tensor G_µv, as

Scholium.

The following 2 × 2 table (Table 1) may illustrate the basic relationships above

The tensors A_µv, B_µv, C_µv, D_µv may have different meanings depending upon circumstances. In our attempt to reach a common representation of all four fundamental interactions, the unified field _RW_µv or the Ricci tensor R_µv is decomposed into several (sub-) fields A_µv, B_µv, C_µv, D_µv in order to achieve unification between general relativity theory and quantum (field) theory from the beginning. The unification of the fundamental interactions is assured by the (sub-) fields A_µv, B_µv, C_µv, D_µv which denote the four basic fields of nature. Quantum field theory itself is describing particles as a manifestation of an (abstract) field. In this context a particle a_i can be associated with the field A_µv, the particle b_i can be associated with the field B_µv, the particle c_i can be associated with the field C_µv, the particle d_i can be associated with the field D_µv. In the following, we can define something like A_µv = a_i ´ _PA_µv and B_µv = b_i ´ _PB_µv and C_µv = c_i ´ _PC_µv and D_µv = d_i ´ _PD_µv where the subscript _P can denote an individual particle field. Maxwell’s theory unified the electrical and the magnetic field into an electromagnetic field. Meanwhile, the electromagnetic and weak nuclear forces have been bound together as an electroweak force. The electroweak force and the strong interaction have been unified into the standard model of particle physics. Such an approach has not enabled a coherent theoretical framework of physics which fully explains and links together the today known physical aspects of objective reality. In contrast to quantum field theory, in this paper, we will not link the electromagnetic and weak nuclear forces together into the electroweak force. On the contrary, we link the strong interaction and the weak nuclear force into an ordinary force. In this sense, all but the electromagnetic force is treated or defined as ordinary force. The ordinary force and the electromagnetic force are or can be linked together into the standard model of particle physics. In our above setting, the ordinary force is determined by the tensor A_µv while the electromagnetic force is determined by the tensor B_µv. Quantum field theory itself focuses on the three known non- gravitational forces and has been experimentally confirmed with tremendous accuracy under some appropriate domains of applicability while general relativity itself focuses on gravity. Still, quantum field theory and general relativity, as they are currently formulated, are mutually incompatible. Lastly, only one of these two theories can be corrector both are incorrect.

Definition: The stress energy tensor of the electro-magnetic field B_µv

We define the second rank covariant stress-energy tensor of the electromagnetic field B_µv, an anti tensor [2] of the tensor A_µv, as

Under conditions of general relativity, where A_µv denotes the stress energy tensor of ordinary energy/matter, the stress-energy tensor of the electromagnetic field B_µv is an anti tensor [2] of ordinary energy/matter A_µv. Under conditions of general relativity, the second rank covariant stress-energy tensor of the electromagnetic field B_µv is determined by an anti-symmetric second-order tensor known as the electromagnetic field (Faraday) tensor F. In general, under conditions of general relativity, the second rank covariant stress-energy tensor of the electromagnetic field B_µv in the absence of “ordinary” matter, which itself is different from the electromagnetic field tensor F, can be derived many different ways. One form of this tensor is

where F is the electromagnetic field tensor and g_µv is the metric tensor of general relativity.

Scholium.

The probability tensor [2] of the second rank covariant stress-energy tensor of the electromagnetic field B_µv is defined as

One possible theoretical geometric formulation of the stress-energy tensor of the electromagnetic field [2] follows as

Definition of Tensors with relation to the Ricci scalar R

In general, we define the second rank covariant metric tensor _Xg_µv of the tensor X_µv under conditions of a Ricci scalar as

where R denotes the Ricci scalar and X_µv denotes a second rank (even a metric) tensor. Thus far, even a metric tensor can possess a metric. A straightforward consequence of this definition is the relationship between the metric tensor _Xg_µv and the probability tensor p(X_µv) as p(X_µv) Ç _Ricg_µv = _Xg_µv. Further, we define n(X_µv) as

where R denotes the Ricci scalar and X_µv denotes a second rank (even a metric) tensor. Further, we define as

where R denotes the Ricci scalar and X_µv denotes acovariant second rank (even a metric) tensor.

Definition: The tensor n(A_µv)

We define the second rank tensor n(A_µv) as

where R denotes the Ricci scalar.

Definition: The metric tensor _Ag_µv

We define the second rank metric tensor _Ag_µv as

where R denotes the Ricci scalar.

Definition: The tensor n(B_µv)

We define the second rank tensor n(B_µv) as

where R denotes the Ricci scalar.

Definition: The metric tensor _Bg_µv

We define the second rank metric tensor _Bg_µv as

where R denotes the Ricci scalar.

Definition: The Tensor n

We define the second rank tensor as

where R denotes the Ricci scalar. Due to our definition before it is n(A_µv) = A_µv/R and n(B_µv) = B_µv/R while at the same time it holds true that, the stress energy tensor is decomposed into the tensors A_µv and B_µv.

Definition: The metric tensor _Eg_µv

We define the second rank metric tensor _Eg_µv as

where R denotes the Ricci scalar.

Definition: The tensor n(C_µv)

We define the second rank tensor n(C_µv) as

where R denotes the Ricci scalar.

Definition: The metric tensor _Cg_µv

We define the second rank metric tensor _Cg_µv as

where R denotes the Ricci scalar.

Definition: The tensor n(D_µv)

We define the second rank tensor n(D_µv) as

where R denotes the Ricci scalar.

Definition: The metric tensor _Dg_µv

We define the second rank metric tensor _Dg_µv as

where R denotes the Ricci scalar.

Definition: The tensor

We define the second rank tensor as

where R denotes the Ricci scalar.

Definition: The tensor _ØEg_µv

We define the second rank metric tensor _ØEg_µv as

where R denotes the Ricci scalar.

Definition: The tensor n(G_µv)

We define the second rank tensor n(G_µv) as

where R denotes the Ricci scalar and G_µv is the Einsteinian tensor.

Definition: The metric tensor _Gg_µv

We define the second rank metric tensor _Gg_µv as

where R denotes the Ricci scalar and G_µv is the Einsteinian tensor.

Definition: The tensor n(G_µv)

We define the second rank tensor n(G_µv) as

where R denotes the Ricci scalar and G_µv is the anti Einsteinian tensor.

Definition: The metric tensor _ØGg_µv

We define the second rank metric tensor _ØGg_µv as

where R denotes the Ricci scalar and G_µv is the anti Einsteinian tensor.

Definition: The metric tensor _grg_µv of the metric tensor g_µv

We define the second rank metric tensor _grg_µv as

where R denotes the Ricci scalar where g_µv denotes the metric tensor of general relativity theory.

Definition: The tensor n(R_µv)

We define the second rank tensor n(R_µv) as

where R denotes the Ricci scalar and R_µv denotes the Ricci tensor.

Definition: The metric tensor _Ricg_µv

We define the second rank metric tensor _Ricg_µv as

where R denotes the Ricci scalar and R_µv denotes the Ricci tensor.

Scholium.

The following 2 × 2 table (Table 2) may illustrate the basic relationships above

The 2 × 2 table (Table 3) illustrates the basic relationships between the metric tensors.

Definition: The tensor g_µv

The mathematics of general relativity are more or less complex. As a result, the curvature of space (represented by the Einstein tensor G_µv) is caused by the presence of matter and energy (represented by the stress-energy tensor T_µv) and vice versa. The cur- vature of space is the cause or determines how matter/energy has to move. The Riemannian metric tensor for a curved space-time of general relativity theory, a kind of generalization of the gravitational potential of Newtonian gravitation, is denoted as

In the following, let us define the following. Let

and

The (unitless) metric tensor g_µv is a central object in general relativity and describes more or less the local geometry of space-time while representing the gravitational potential. The metric tensor determines the invariant square of an infinitesimal line element, denoted as ds and often referred to as an interval. In general, the generalization of the standard measure of distance ds between two points in Euclidian space due to the Pythagorean theorem is defined as

or

In general, a coordinate system can be changed from the Euclidean Y’s to some coordinate system of X’s then

and

The Pythagorean theorem is known to be defined as

where δ_mn denotes the known Kronecker delta. Using Einstein’s summation convention, the metric tensor g_µv is

and a curved space compatible formulation of the Pythagorean theorem follows as usual as

In other words, it is

Under conditions, where

it is

Dividing the equation before by the speed of the light squared, c², it is

where _tg_µv = (1/c²) ´ g_µv. The term ds²/c² yields the time squared or ds²/c² = d_Rt² as do the other terms. The equation before can be rearranged as

Rearranging equation, we obtain

or while using Einstein’s summation convention,

or

Multiplying by ((R/2) − Λ), it is

Definition: The metric tensor of the electromagnetic field _EMg_µv

We define the second rank metric tensor of the electro-magnetic field _EMg_µv of preliminary unknown structure as

where Y denotes an unknown (i.e. scalar) parameter. Due to this definition, it is B_µv = Y ´ _EMg_µv.

Definition: The anti metrictensor of the electromagnetic field ₀g_µv or _Wg_µv

We define the second rank anti metric tensor of the electro-magnetic field _Wg_µv of preliminary unknown structure as

where Y denotes an unknown (i.e. scalar) parameter. Due to this definition, it is D_µv = Y ´ _Wg_µv.

Definition: The relationships between the metric tensors

In general, the metric tensor for a curved space-time of general relativity theory is equally determined as

where _EMg_µv = g_µv ? _Wg_µv and _EMg_µv denotes the second rank metric tensor of the electro- magnetic field while _Wg_µv is the second rank anti metric tensor of the electro-magnetic field. Both tensors are of still unknown structure. From this definition, it follows that

Scholium.

The true meaning of the metric tensor _Wg_µv is not clear at this moment. One is for sure, the same tensor is an anti-tensor of the metric tensor of the electromagnetic field _EMg_µv. There is some theoretical possibility that the tensor _Wg_µv is related to something like the metric tensor of the gravitational waves, therefore the abbreviation _Wg_µv.

Definition: The tensor of energy of the unified field theory _RE_µv

In order to assure compatibility between general theory of relativity and the unified field theory, we define the following relationship between the stress energy tensor of general relativity and the tensor of energy [2] of unified field theory _RE_µv as

while the value of X is undermined at this moment. The value of X can be X = 1.

Definition: The tensor of time of the unified field theory _Rt_µv

In order to assure compatibility between the second rank tensor of general theory of relativity and tensor of time [2] _Rt_µv of the unified field theory, we define the following relationship.

while the value of X is undermined at this moment. The value of X can be X = 1.

Definition: The tensor of space of the unified field theory _RS_µv

In order to assure compatibility between the second rank Ricci tensor R_µv of general theory of relativity and tensor of space [2] _RS_µv of the unified field theory, we define the following relationship.

while the value of X is undermined at this moment. The definition before does not exclude the case that X = 1.

Claim. (Theorem. Proposition. Statement.)

In general, the gravitational and the electromagnetic field can be joined into one single hyperfield which itself is completely determined by the geometrical structure of the space-time. We obtain

Direct proof.

In general, using axiom I is it

Multiplying this equation by the stress-energy tensor of general relativity, it is

where γ is Newton’s gravitational “constant” [17] [18] , c is the speed of light in vacuum and, sometimes referred to as “Archimedes” constant’, is the ratio of a circle’s circumference to its diameter. Due to Einstein’s general relativity, the equation before is equivalent with

where R_µv is the Ricci curvature tensor (the trace of Rimanian curvature tensor), R is the scalar curvature, g_µv is the metric tensor, Λ is the cosmological constant and T_µv is the stress-energy tensor. By defining the Einstein tensor as, it is possible to write the Einstein field equations in a more compact as

Due to our definition above it is G_µv = A_µv + C_µv. Substituting this relationship into the equation before, we obtain

Under these conditions, we recall our definition before where . Substituting this relationship into the equation before, we obtain

where A_µv denotes the stress energy tensor of ordinary matter and B_µv denotes the stress energy tensor of the electromagnetic field. Simplifying equation, it is

where C_µv denotes the gravitational field due to the stress energy tensor of ordinary matter A_µv. We add the tensor C_µv on both sides of the equation before. The unification of gravity and electromagnetisms under conditions of general relativity theory follows as

or in general as

Quod erat demonstrandum.

Scholium.

The theorem of the unification of gravity and electromagnetism does not contain any additional fields and is formulated in four-dimensional space-time. Thus far, within the sum of the tensors B_µv + C_µv, both electromagnetism and gravity are successfully unified and linked to each other. Up to now, there is neither theoretical nor experimental evidence that there might be unobserved additional fields or extra dimensions necessary for the unification of gravity and electromagnetism. Therefore, for geometry underlying the theorem of the unification of gravity and electromagnetism we choose Riemannian geometry which is known to be suitable for gravitational interaction. Accordingly, until today all attempts known to geometrize electromagnetism or unify electromagnetism with gravitation in the framework of Riemannian geometry were in vain. Still, the theorem of the unification of gravity and electromagnetism demonstrates equally that Riemannian geometry is appropriate for unification of gravitation and electromagnetism. The most important and interesting thing is a prediction of the theorem of the unification of gravity and electromagnetism that the stress energy tensor of the electromagnetic field B_µv is a source for ordinary gravitational field C_µv. From physical point of view, this prediction can be confirmed by experiments in strong electromagnetic field very precisely.

Lastly, the electromagnetic field B_µv is a source for the ordinary gravitational field C_µv since both fields are related by the equation and the ordinary gravitational field C_µv is itself is a determining part of Einstein’s tensor G_µv. Furthermore, the ordinary gravitational field C_µv when the stress energy tensor of the electromagnetic field B_µv is equal to zero (B_µv = 0) is still determined by the equation. Thus far, under these circumstances it is and the ordinary gravitational field C_µv is given exactly by the equation C_µv = −Λ ´ g_µv.

In conclusion, we note that when the ordinary gravitational field C_µv is equal to zero or C_µv = 0 the stress energy tensor of the electromagnetic field B_µv derived from the equation is determined in this context by the equation . In other words, we obtain Λ ´ g_µv = B_µv. Under these conditions, the metric tensor _EMg_µv of the stress-energy tensor of the electromagnetic field B_µv follows in general from the equation as .

Claim. (Theorem. Proposition. Statement.)

The anti Einsteinian tensor G_µv is determined as

Direct proof.

In general, using axiom I is it

Multiplying this equation by the Ricci Tensor R_µv, it is

Due to our definition above, it is. Substituting this relationship into the equation before, we obtain

The sum of the tensor G_µv = B_µv + D_µv can be obtained as

which can be simplified as

Due to our definition, Einsteinian tensor G_µv is defined as G_µv = A_µv + C_µv. Rearranging equation above, it is

Einstein’s tensor G_µv is defined as. Substituting this relationship into the equation before, we obtain

Rearranging equation, we obtain

At the end, we obtain

Quod erat demonstrandum.

Claim. (Theorem. Proposition. Statement.)

The unknown parameter Y is determined as

where R denotes the Ricci scalar.

Direct proof.

In general, using axiom I is it

Multiplying this equation by the anti Einsteinian tensor G_µv, it is

The same tensor was determined by the theorem before as B_µv + D_µv = G_µv. Substituting this relationship into the equation before, we obtain

Due to our definition above, it is as B_µv = Y ´ _EMg_µv and D_µv = Y ´ _Wg_µv. Substituting this relationship into the equation before, we obtain

Due to our definition g_µv = _EMg_µv + _Wg_µv, the equation before can be rearranged as

In other words, it is

A further manipulation of the equation before yields the result that

Quod erat demonstrandum.

Scholium.

Such a result is logical too. Due to our definition it is

where _EMg_µv = g_µv − _Wg_µv and _EMg_µv denotes the second rank metric tensor of the electro- magnetic field while _Wg_µv is the second rank anti metric tensor of the electro-magnetic field. Multiplying equation above by the term (R/2), we obtain

which is exactly the result as obtained above.

Claim. (Theorem. Proposition. Statement.)

The geometrization of the stress-energy tensor of the electromagnetic field under conditions of general relativity follows as

where R denotes the Ricci scalar and _EMg_µv denotes the metric tensor of the electromagnetic field.

Direct proof.

In general, using axiom I is it

Multiplying this equation by the stress-energy tensor of the electromagnetic field, denoted as B_µv, it is

Due to our definition above, the stress-energy tensor of the electromagnetic field was determined by the relationship B_µv = Y ´ _EMg_µv. Rearranging the equation before we obtain

According to the theorem before, the unknown parameter Y is determined as Y = R/2. The geometrization of the electromagnetic field under conditions of general relativity follows as

Quod erat demonstrandum.

Scholium.

In a more far reaching development, at least since general relativity theory brought the geometry to the scenario of physics, many attempts were made to extend general relativity’s geometrization of gravitation to non-gravitational fields. In particular, the geometrization of the electromagnetic field became a principal focus and a cornerstone of physical interest and inquiry. The many geometric theories of electromagnetism as published meanwhile are still not consistent with the framework of the quantum theory or self-contradictory, despite the fact that the electromagnetic theory was consolidated in the 19th century. The present theorem before describes the stress-energy tensor of the electro-magnetic field as directly related or determined by the space-time geometry or the metric tensor _EMg_µv. A unified field theory, in the sense of a completely geometrical field theory of all fundamental interactions, is no longer only a theoretical desire.

Claim. (Theorem. Proposition. Statement.)

The metric tensor of the electromagnetic field _EMg_µv under conditions of general relativity is determined as

where R denotes the Ricci scalar and _EMg_µv denotes the metric tensor of the electromagnetic field.

Direct proof.

In general, using axiom I is it

Multiplying this equation by the stress-energy tensor of the electromagnetic field, abbreviated as B_µv, it is

Due to our theorem before, the geometrization of the electromagnetic field under conditions of general relativity is determined as

The stress-energy tensor of the electromagnetic field B_µv is determined in detail i.e. by the relationship

where F is the electromagnetic field tensor and g_µv is the metric tensor. The equation before changes to

The metric tensor of the electromagnetic field _EMg_µv under conditions of general relativity is determined as

Quod erat demonstrandum.

Claim. (Theorem. Proposition. Statement.)

The tensor C_µv is determined as

Direct proof.

In general, using axiom I is it

Multiplying this equation by the stress-energy tensor of the electromagnetic field, denoted as B_µv, it is

Due to our theorem before, the metric tensor of the electromagnetic field under conditions of general relativity is determined as

where R denotes the Ricci scalar and _EMg_µv denotes the metric tensor of the electromagnetic field. Due to the another theorem above, it is

The tensor C_µv is determined by the stress energy tensor of the electromagnetic field B_µv as

Quod erat demonstrandum.

Scholium.

Lastly, the stress-energy tensor of the electromagnetic field B_µv is a source or a determining part for the ordinary gravitational field C_µv. From physical point of view, this theorem can be confirmed by experiments in strong electromagnetic fields.

Claim. (Theorem. Proposition. Statement.)

The geometrized form of the hyper-tensor of unification of gravitation and electromagnetism is determined as

Direct proof.

In general, using axiom I is it

Multiplying this equation by the stress-energy tensor of the electromagnetic field, denoted as B_µv, it is

Due to our theorem before, the stress energy tensor of the electromagnetic field under conditions of general relativity is determined as

where R denotes the Ricci scalar and _EMg_µv denotes the metric tensor of the electromagnetic field. Due to a theorem before, it is

The tensor C_µv is determined by the stress energy tensor of the electromagnetic field B_µv as

Adding the stress-energy tensor of the electromagnetic field B_µv = (R/2) ´ _EMg_µv to the equation before, we obtain the geometrized form of the hyper-tensor of C_µv puls B_µv (i.e. the unity of gravitation and electromagnetism) as

Quod erat demonstrandum.

Claim. (Theorem. Proposition. Statement.)

The tensor D_µv is determined as

Direct proof.

In general, using axiom I is it

Multiplying this equation by the stress-energy tensor of the electromagnetic field, denoted as B_µv, it is

Due to our theorem before, the stress energy tensor of the electromagnetic field under conditions of general relativity is determined as

where R denotes the Ricci scalar and _EMg_µv denotes the metric tensor of the electromagnetic field. Adding the tensor D_µv, we obtain

According to a theorem before, this relationship is equivalent with

Rearranging the equation before, the tensor D_µv is determined as

Quod erat demonstrandum.

Claim. (Theorem. Proposition. Statement.)

The geometrization of the stress-energy tensor of “ordinary” matter A_µv can be obtained as

Direct proof.

In general, using axiom I is it

Multiplying this equation by the Ricci Tensor R_µv, it is

Due to our definition above, it is. Substituting this relationship into the equation before, we obtain

The tensor of ordinary matter A_µv follows as

The tensor B_µv itself was determined as. The addition of the tensors D_µv plus C_µv is determined as. The equation before changes to

Rearranging equation before, we obtain

The tensor (R/2) ´ g_µv is determined as. The equation can be simplified as

The geometrization of “ordinary” matter follows in general as

Quod erat demonstrandum.

Claim. (Theorem. Proposition. Statement.)

The probability tensor p(B_µv) of the stress-energy tensor of the electromagnetic field is determined as

Direct proof.

In general, using axiom I is it

Multiplying this equation by the stress-energy tensor of the electromagnetic field, denoted as B_µv, it is

Due to our theorem before, the geometrization of the electromagnetic field under conditions of general relativity is determined as

The stress-energy tensor of the electromagnetic field B_µv was determined i.e. by the relationship

where F is the electromagnetic field tensor and g_µv is the metric tensor. The equation before changes to

The Ricci scalar R is defined as the contraction of the Ricci tensor R_µv or it is R = g^µvR_µv. The equation before changes to

A commutative division [2] by the Ricci tensor R_µv leads to the relationship

This equation is identical with the probability tensor p(B_µv) of the stress-energy tensor of the electromagnetic field. In general it is

Quod erat demonstrandum.

Claim. (Theorem. Proposition. Statement.)

In general let n(X_µv) = X_µv/R where X_µv denotes a second rank co-variant tensor and R denotes the Ricci scalar, the contraction of the Ricci tensor as R = g^µvR_µv. Further, p(X_µv) = X_µv/R_µv denotes the probability tensor [2] of the tensor X_µv. The probability tensor p(X_µv) of a tensor X_µv is determined by the metric tensor as

Direct proof.

In general, using axiom I is it

Multiplying this equation by the tensor X_µv, it is

A commutative [2] division of the tensor X_µv by the Riccitensor R_µv yields

which is equivalent with

or with

Rearranging equation it is

Changing equation, we obtain

Due to the relationship R = g^µvR_µv, the equation before simplify as

or as

In general, it is n(X_µv) = X_µv/R. The probability tensor of a tensor X_µv is determined by the (inverse or) conjugate metric tensor as

Quod erat demonstrandum.

Scholium.

Quantum physics (quantization) focuses on the probability (amplitudes) while general relativity theory relies on geometry (tempo-spatial points). The definition of a probability tensor p(X_µv) of a tensor X_µv marks a remarkable degree of interaction between probability theory and the highly dimensional theory of general relativity and is a key step to the unification of quantum physics and general relativity by probabilitizing general relativity’s geometric background. In principle, a contradiction free transformation of a geometrical mathematical framework into a probabilistic mathematical framework and vice versa is possible. A geometrization of probability theory appears to be necessary too.

Claim. (Theorem. Proposition. Statement.)

The relationship between the tensors of general theory of relativity can be normalized as

Direct proof.

In general, using axiom I is it

Multiplying this equation by the stress-energy tensor of general relativity, it is

where γ is Newton’s gravitational “constant” [17] [18] , c is the speed of light in vacuum and π, sometimes referred to as “Archimedes” constant’, is the ratio of a circle’s circumference to its diameter. Due to Einstein’s general relativity, Einstein’s field equations are determined as

where R_µv is the Ricci curvature tensor (the trace of Rimanian curvature tensor), R is the scalar curvature, g_µv is the metric tensor, Λ is the cosmological constant and T_µv is the stress-energy tensor. Rearranging equation we obtain

A commutative [2] division of tensors simplifies the equation as

where 1_µv denotes the tensor of unified field [2] . In general, a normalization of some tensors of general relativity follows as

Quod erat demonstrandum.

Claim. (Theorem. Proposition. Statement.)

The relationship between the tensors of the unified field theory normalized as

Direct proof.

In general, using axiom I is it

Multiplying this equation by the energy tensor of general relativity _RT_µv, it is

The field equations of the unified field theory [2] are determined as

where _RS_µv is the tensor of space [2] of the unified field theory and _Rt_µv is the tensor of time [2] of the unified field theory. Rearranging equation it is

A commutative [2] division of tensors simplifies the equation as

where 1_µv denotes the tensor of unified field [2] . In general, a normalization of some tensors of the unified field theory follows as

Quod erat demonstrandum.

Claim. (Theorem. Proposition. Statement.)

The unknown parameter X, which should equal 1, can be determined as

Direct proof.

In general, using axiom I is it

Multiplying this equation by the tensor of the unified field 1_µv, of the unified field, it is

or

Due to the theorem about the normalization of some tensors of the unified field theory, this equation rearranges to

According to the theorem about the normalization of some tensors of the general theory relativity, the equation before rearranges to

A commutative multiplication and division [2] of tensors changes the equation before to

Due to our definition, it is and equally. Substituting these relationships into the equation before we obtain

Due to commutative operations [2] , this equation can be simplified as

which itself can be simplified as

or as

or as

The determination of the value of X follows as

Quod erat demonstrandum.

Scholium.

The straightforward question is, must we accept that (_RS_µv/R_µv) = 1_µv or (_RS_µv/R_µv) = c² or (_RS_µv/R_µv) = 1/c²? The probability tensor of the stress-energy tensor of the theory of general relativity is defined as

.

The energy tensor of the unified field theory is defined as

.

The value of X is determined as (_RS_µv/R_µv). The equation before changes to as

.

In general, the probability tensor is of use to express the energy tensor as

.

The probability tensor simplifies this equation simplifies in other word to

.

The probability tensor of the tensor is defined in general something as

.

The value of X is determined equally as (_RS_µv/R_µv). The tensor of time

follows as

or as

or as

.

In last consequence, the relationship between the field equations of unified field theory and Einstein’s theory of general relativity is determined by the equation

or by the equation

Einstein’s field equation yields the result

What is the physical meaning of Einstein’s field equation, if we multiply the same by the term (1/c²). In this case we obtain

In the International System of Units the joule, the unit of energy, is defined as 1[J] = 1[kg∙m²/s²] = 1[N ´ m] while 1[N] = 1[kg∙m/s²] = 1[J/m] denotes the unit of force. The stress-energy tensor T_µv without the mathematical term has the unit of energy density [J/m³], it is 1[J/m³] = 1[(kg∙m²)/(s²∙m³)]. Let us multiply the stress-energy tensor T_µv by (1/c²), we obtain which is equivalent with. Conse- quently, the term s² and m² cancels out and we obtain the unit . In other words, the stress-energy tensor T_µv changes to the stress tensor of matter. Thus far, under these conditions there is some evidence that it makes sense to assume that [2] . This assumed as correct, the tensor _Rg_µv [2] is determined as where the term (1/c²) ´ g_µv can denote something like the metric tensor of time _tg_µv = (1/c²) ´ g_µv.

In general theory of relativity the gravitational field is completely geometrized. Still, Einstein failed to geometrize the stress-energy-momentum tensor T_µv too. Einstein was convinced that the main problem in the unified field theory was the geometrization of the stress-energy-momentum tensor of matter on the right-hand side of his field equations known to be determined as. The geometrization of the stress-energy-momentum tensor of the matter T_µv should result in the geometrization of the quantum i.e. matter fields.

Claim. (Theorem. Proposition. Statement.)

The total geometrization of all fields or Einstein’s field equations with geometrized stress-energy-momentum tensor of the energy (T_µv) are determined as

Direct proof.

In general, using axiom I is it

Multiplying this equation by the tensor of the stress-energy tensor , we do obtain

Due to Einstein’s general theory relativity, this equation can be rearranged as

Multiplying Einstein’s field equation by the term (2/R), we obtain

Due to our definition, this equation is equivalent with

Multiplying the equation before by the term (R/2), Einstein’s field equation completely geometrized follows as

Quod erat demonstrandum.

Scholium.

In view of Einstein’s geometrization of gravity, the stress-energy tensor T_µv is the source-term of Einstein’s field equations. From the geometrical point of view, the stress-energy tensor T_µv is still a field without any geometrical significance. In particular, the main goal of the very transparent and also highly general theorem above is to describe matter as an inherent geometrical structure and to incorporate both, the principles of general relativity and quantum theory, in one mathematical formula. Such a theorem is expected to be able to provide a satisfactory (geometrical) description of the microstructure of spacetime, to geometrize the quantum. We rearrange the equation before as

or as

Einstein’s vacuum field equations can be obtained when the known the stress-energy- momentum tensor is to be determined as (R/2) ´ _Eg_µv = 0. Under these conditions (T_µv = 0), the Einstein vacuum equations are determined by the fact that

One focus of this paper is the attempt to build a bridge between quantum theory and classical geometry. The equation before can be changed as

In this context we multiply the equation before by the wave-function Ψ. We obtain the Schrödinger’s equation as

or a kind of a “normalized” Schrödinger’s equation where R = () ~ h/π as

an equation where quantum meets geometry and vice versa, where the metric (i.e. geometry) is a determining part of this equation, but the wave-function (i.e. quantum) too. In last consequence, the gravitational field itself can be quantized. A profound methodological challenge for the physicist was the geometrization of the stress-energy tensor T_µv. This problem is solved by this theorem. The mathematical term (R/2) ´ _Eg_µv denotes the geometrical description of the stress-energy tensor T_µv of general theory of relativity. Thus far, in general it is, where _Eg_µv denotes the metric tensor of the stress energy tensor T_µv.