Template:Original research

Einstein Probabilistic Units provides new insights into this elusive yet straightforward question. We will focus our inquiry on the gravitational and electrostatic forces between two electrons

If we take any two electrons and locate them anywhere within the universe, the relative strength of the gravitational force to the electrostatic force is 2.4 x 10^-43.$${\displaystyle \frac{F_{egravity}}{F_{eelectrostatic}}=\frac{G{m}_e^2}{k_e{q}_e^2}=\frac{5.5\times 10^{-71}N{m}^2}{2.3\times 10^{-28}N{m}^2}=2.4\times 10^{-43}}$$

To help frame this problem we will use dimensional balancing. Then a generalized model using Einstein Probabilistic Units is adapted to provide additional insight into the nature of gravity and it's coupling constants.

Dimensional Balancing is an extension of dimensional analysis. In dimensional balancing, the exponential dimensional profile on the right-hand side of the equation is always equal to the exponential dimensional profile on the left-hand side of the equation. Applying dimensional balancing to our inquiry reveals that force and charge share an exponential dimensional profile of D² while mass and energy have an exponential dimensional profile of D³. Some examples of dimensional balancing are;

${\displaystyle Force=m\times \frac{l}{t^2}=D_m^3\times D_l^1\times D_t^{-2}=D_{Force}^2}$

${\displaystyle Charge=m^{1/2}\times l^{3/2}\times t^{-1}=D_m^{3/2}\times D_l^{3/2}\times D_t^{-1}=D_{Charge}^2}$

${\displaystyle Mass=\frac{E}{c^2}=\frac{D_E^3}{D_c^0}=D_m^3}$

We can hypothesize that the relative weakness of the gravitational to the electrostatic force is due to the difference in the above exponential dimensional profiles for charge D²  and mass D³. This dimensional reduction is also illustrated by examining electrical and magnetic fields that have a dimensional profile of D⁰ as compared to the gravitational field that have a dimensional profile of D^-1

Electric Field ${\displaystyle 𝐄}$ = ${\displaystyle \frac{D_F^2}{D_q^2}=D_{𝐄}^0}$

Magnetic Field ${\displaystyle 𝐁}$ = ${\displaystyle \frac{D_F^2}{D_q^2{D}_{𝐯}^0}=D_{𝐁}^0}$

Gravitational Field ${\displaystyle 𝐠}$ = ${\displaystyle \frac{D_F^2}{D_m^3}=D_{𝐠}^{-1}}$

In contrast, each dimensional D³ mass must undergo a dimensional reduction of D^-1 to develop into a D² gravitational force. In Newton's universal gravitational force equation, for two masses results in the Newton gravitational constant having a dimensional profile of D^-2.

Dimensionally, a D² charge can transform directly into D² electrostatic force. In Coulomb's electrostatic force equation, for two charges, the Coulomb constant has a dimensional profile of D⁰.

${\displaystyle CoulombConstant{k}_e=\frac{m{l}^3}{C^2{t}^2}=\frac{D_m^3{D}_l^3}{D_C^4{D}_t^2}=D_{k_e}^0}$

For a pair of electrons the electrostatic force is;

${\displaystyle F_{eelectrostatic}=k_e\frac{q_e^2}{r^2}=D_{k_e}^0\frac{D_{q_e}^4}{D_r^2}=D_{F_{e}electrostatic}^2}$

${\displaystyle NewtonsGravitationalConstantG=\frac{l^3}{m}\left(\frac{1}{t^2}\right)=\frac{D_l^3}{D_m^3}\left(\frac{1}{D_t^2}\right)=D_G^{-2}}$

For a pair of electron the gravitational force is;

${\displaystyle F_{egravity}=G\frac{m_e^2}{r^2}=D_G^{-2}\frac{D_{m_e}^6}{D_r^2}=D_{F_{e}gravity}^2}$

This supports the observation that the charge to force process dose not require a dimensional transformation.

In this section we will generalize Einstein's B coefficient for light to apply to all physical process, relationships and laws. This will provide us additional insight into the gravitational frequency squared dimensional reduction discussed above.

Einstein's B coefficient is given by and has a frequency squared variable;

${\displaystyle B=\frac{l}{m}=\frac{c^3}{h{v}^2}}$

In Einstein's field equations, Einstein’s gravitational constant kappa is proportional to Einstein's B_k gravitational coefficient, (at the Planck scale this is also equal to B_P or the B₀ zero-point background radiation field).

${\displaystyle B_{\kappa }=\frac{\kappa }{8\pi }=\frac{G}{c^2}=B_P=\frac{l_P}{m_P}=7.4\times 10^{-28}\frac{m}{kg}}$

All values of B_x are frequency squared scaled versions of Einstein's B_k gravitational coefficient;

${\displaystyle B_x=B_{\kappa }\times \frac{v_{\kappa }^2}{v_x^2}}$

Einstein’s B_e coefficient for the electron is;

${\displaystyle B_e=\frac{r_e}{m_e}=\frac{2.8\times 10^{-15}m}{9.1\times 10^{-31}kg}=3.1\times 10^{15}\frac{m}{kg}}$

Comparing the ratio of B_k to B_e,

${\displaystyle \frac{B_{\kappa }}{B_e}=2.4\times 10^{-43}}$

This ratio is exactly equal to the relative strength of the gravitational to the electrostatic force of two electrons. As the B coefficient is proportional to the inverse frequency squared the following holds:

${\displaystyle \frac{G{m}_e^2}{k_e{q}_e^2}=\frac{B_{\kappa }}{B_e}=\frac{{\displaystyle \underset{Be}{\overset{2}{\upsilon }}}}{{\displaystyle \underset{B\kappa }{\overset{2}{\upsilon }}}}=2.4\times 10^{-43}}$

From the above we can also conclude the weakness of the gravitational force is related to a frequency squared dimensional reduction needed to transform mass into force.

Forces can be defined by using Einstein's B coefficient.

${\displaystyle F_B=\frac{c^2}{B}=\frac{h}{c}{\upsilon }^2=m\times a}$

Expressing Newton's law of universal gravitation using Einstein's B coefficient

${\displaystyle F_{BG}=G\frac{m^2}{r^2}=\frac{G}{B^2}}$

For an electron these forces are,

${\displaystyle F_{B_e}=\frac{c^2}{B_e}=\sqrt{F_P{F}_{B{G}_e}}=2.9\times 10^{1}N}$

${\displaystyle F_{B{G}_e}=\frac{G}{B_e^2}=\frac{F_{B_e}^2}{F_{B_P}}=7.0\times 10^{-42}N}$

${\displaystyle F_P=\frac{c^4}{G}=\frac{c^2}{B_{\kappa }}=\frac{c^2}{B_P}=\frac{F_{B_e}^2}{F_{{BG}_e}}=1.2\times 10^{44}N}$

Thus illustrating the frequency squared reduction.

${\displaystyle \frac{F_{B{G}_e}}{F_{B_e}}=\frac{G\times B_e}{c^2\times B_e^2}=\frac{G\times \hslash }{c^5}{\displaystyle \underset{B_e}{\overset{2}{\upsilon }}}=Constant\times {\displaystyle \underset{B_e}{\overset{2}{\upsilon }}}=2.4\times 10^{-43}}$

We can extend the gravitational to the electrostatic force relationship;

${\displaystyle \frac{G{m}_e^2}{k_e{q}_e^2}=\frac{B_{\kappa }}{B_e}=\frac{{\displaystyle \underset{Be}{\overset{2}{\upsilon }}}}{{\displaystyle \underset{P}{\overset{2}{\upsilon }}}}=\frac{F_{B{G}_e}}{F_{B_e}}=\frac{F_{B_e}}{F_P}=2.4\times 10^{-43}}$

To further understand the relationship for the fundamental gravitational and electrostatic forces, we will study the Einstein B coefficient oscillator strength. The oscillator strength f expresses the probability for creating a stimulated change in momentum or stimulated force. Einstein B  coefficient expressed in terms of oscillator strength ƒ is;

${\displaystyle B=\frac{k_e{e}^2}{m_{e}h{\upsilon }_{}}f}$

Using Einstein B coefficient, force can be expressed as;

${\displaystyle Force{}_B=\frac{c^2}{B}=\frac{h}{c}{\upsilon }^2=\frac{m_e{c}^{2}h{\upsilon }_{}}{k_e{e}^2}\frac{1}{f}}$

Solving for oscillator strength as a function of frequency we get;

${\displaystyle f=\frac{m_e{c}^3}{k_e{e}^2}\frac{1}{\upsilon }=\frac{1.1\times 10^{23}}{\upsilon }\frac{1}{s}}$

Solving oscillator strength for specific frequencies,

Compton Frequency

${\displaystyle \upsilon ={\upsilon }_{B_e}then{f}_{B_e}^{-1}=\frac{1}{\sqrt{\alpha }}{f}_{B_e}^{-2}=\frac{1}{\alpha }}$

Electron B Frequency

${\displaystyle \upsilon ={\overline{\upsilon }}_{C}then{f}_C^{-1}=\alpha f_C^{-2}={\alpha }^2}$

Planck Frequency

${\displaystyle \upsilon ={\upsilon }_{P}then{f}_P^{-1}=\frac{\alpha }{\sqrt{{\alpha }_G}}{f}_P^{-2}=\frac{{\alpha }^2}{{\alpha }_G}}$

We can extend the gravitational to the electrostatic force relationship;

${\displaystyle \frac{G{m}_e^2}{k_e{q}_e^2}=\frac{B_{\kappa }}{B_e}=\frac{{\displaystyle \underset{Be}{\overset{2}{\upsilon }}}}{{\displaystyle \underset{P}{\overset{2}{\upsilon }}}}=\frac{F_{G_e}}{F_{B_e}}=\frac{F_{B_e}}{F_P}=\frac{f_P^2}{f_{B_e}^2}=\frac{{\alpha }_G}{\alpha }={\alpha }_e=2.4\times 10^{-43}}$

This relationship allows us to define the following coupling constants in terms of Einstein's B coefficient frequency squared;

${\displaystyle {\alpha }_G=\frac{{\overline{\upsilon }}_C^2}{{\displaystyle \underset{P}{\overset{2}{\upsilon }}}}\alpha =\frac{{\overline{\upsilon }}_C^2}{{\displaystyle \underset{B_e}{\overset{2}{\upsilon }}}}{\alpha }_e=\frac{{\upsilon }_{B_e}^2}{{\displaystyle \underset{P}{\overset{2}{\upsilon }}}}}$

Using Einstein's Gravitational Coefficient and dimensional balancing we have demonstrated that the frequency squared dimension reduction used in Newton's law of universal gravitation plays a significant role in the relative strength of the of the gravitational force to the electrostatic force.

These concepts have also been extended to extend our understanding of the coupling constants and their dependence on the frequency squared relationships.

Given the probabilistic nature of Einstein's Coefficients, the hope is that the generalization of Einstein's Gravitational Coefficient can be used to converge the classic and quantum understanding of gravity.

Additional the generalization of Einstein's Gravitational Coefficient should lend itself to string theory models