Physics/Essays/Fedosin/Stoney scale

Stoney scale is a fundamental scale, named after the Irish physicist George Johnstone Stoney, who first proposed the ‘’elementary electric charge’’ in 1881. ^[1] It defines that fine structure constant ${\displaystyle \alpha }$ is equal to gravitational coupling constant (and to electric coupling constant) ${\displaystyle {\alpha }_S}$ of Stoney scale:

${\displaystyle {\alpha }_S=\frac{m_S^2}{2hc{\epsilon }_g}=\frac{e^2}{2hc{\epsilon }_0}=\alpha ,}$

where

• ${\displaystyle m_S=\sqrt{\frac{e^2}{4\pi {\epsilon }_{0}G}}}$ is the Stoney mass;
• ${\displaystyle e}$ is the elementary charge;
• ${\displaystyle {\epsilon }_0}$ is the electric constant;
• ${\displaystyle G}$ is the gravitational constant;
• ${\displaystyle h}$ is the Planck constant;
• ${\displaystyle c}$ is the speed of light in vacuum;
• ${\displaystyle {\epsilon }_g}$ is the gravitoelectric gravitational constant.

There is the dimensionless magnetic coupling constant ${\displaystyle \beta =\frac{1}{4\alpha }}$ that could be named as the Stoney scale force constant since it defines the force interactions (electric, gravitational, etc.) in the Stoney scale.

Contemporary physics has settled on the Planck scale as the most suitable scale for the unified field theory. The Planck scale was however anticipated by George Stoney. ^[1] James G. O’Hara ^[2] pointed out in 1974 that Stoney’s derived estimate of the unit of charge, 10^-20 Ampere (later called the Coulomb), was Template:Frac of the correct value of the charge of the electron. Stoney used the quantity 10¹⁸ for the number of molecules presented in one cubic millimeter of gas at standard temperature and pressure. Using Avogadro constant Template:Val, and the volume of a mole (at standard conditions) of Template:Val, we derive, instead of 10¹⁸, the estimate Template:Val. So, if Stoney could use the true number of molecules his estimate of the unit of charge was about Template:Frac of the correct value of the charge.

For a long time the Stoney scale was in the shadow of the Planck scale (something like a "deviation" of it). However, after intensive investigation of gravitation by using the Maxwell-like gravitational equations during last decades, became clear that Stoney scale is independent scale of matter.

The set of primary vacuum constants is: the speed of light ${\displaystyle c}$; the electric constant ${\displaystyle {\epsilon }_0}$; the speed of gravity ${\displaystyle c_g}$ (usually equated to the speed of light); the gravitational constant ${\displaystyle G}$.

The set of secondary vacuum constants is: The vacuum permeability: ${\displaystyle {\mu }_0=\frac{1}{{\epsilon }_0{c}^2}}$;

The electromagnetic impedance of free space:

${\displaystyle Z_0={\mu }_{0}c=\sqrt{\frac{{\mu }_0}{{\epsilon }_0}}=\frac{1}{{\epsilon }_{0}c}}$;

The gravitoelectric gravitational constant: ${\displaystyle {\epsilon }_g=\frac{1}{4\pi G}}$;

The gravitomagnetic gravitational constant: ${\displaystyle {\mu }_g=\frac{4\pi G}{c_g^2}}$;

The gravitational characteristic impedance of free space:

${\displaystyle {\rho }_g=\sqrt{\frac{{\mu }_g}{{\epsilon }_g}}=\frac{4\pi G}{c_g}.}$

Note that all Stoney and Planck units are derivatives from the vacuum constants, therefore the last are more fundamental that units of any scale.

If ${\displaystyle c_g=c}$ the above fundamental constants define naturally the following relationship between mass and elementary charge for the Stoney mass:

${\displaystyle m_S=e\sqrt{\frac{{\epsilon }_g}{{\epsilon }_0}}=e\sqrt{\frac{{\mu }_0}{{\mu }_g}}=e\sqrt{\frac{Z_0}{{\rho }_g}}}$,

and these constants are the base units of the Stoney scale.

Stoney mass:

${\displaystyle m_S=e\sqrt{\frac{{\epsilon }_g}{{\epsilon }_0}}=\sqrt{\alpha }{m}_P=1.85927\cdot 10^{-9}}$ kg,

where ${\displaystyle m_P}$ is the Planck mass.

Stoney gravitational fine structure constant:

${\displaystyle {\alpha }_S=\frac{m_S^2}{2hc{\epsilon }_g}=\alpha =7.29735257\cdot 10^{-3}}$.

Stoney fictitious gravitational torsion mass:

${\displaystyle m_{\mathrm{\Omega }}=\frac{h}{m_S}=3.563801\cdot 10^{-25}}$ J s kg⁻¹.

Stoney scale gravitational torsion coupling constant: ^[3]

${\displaystyle {\beta }_g=\frac{{\epsilon }_{g}hc}{2m_S^2}=\frac{h}{2c{\mu }_{g0}{m}_S^2}=\frac{1}{4\alpha }=34.258999743}$.

Stoney gravitational impedance quantum:

${\displaystyle R_g=\frac{m_{\mathrm{\Omega }}}{m_S}=\frac{h}{m_S^2}=1.91677\cdot 10^{-16}}$ J s kg⁻².

Stoney charge:

${\displaystyle q_S=e=1.602176565\cdot 10^{-19}}$ C.

Stoney electric fine structure constant:

${\displaystyle {\alpha }_S=\frac{q_S^2}{2hc{\epsilon }_0}=\alpha .}$

Stoney fictitious magnetic charge:

${\displaystyle q_m=\frac{h}{e}=4.1356675\cdot 10^{-15}}$ Wb.

Stoney scale magnetic coupling constant:

${\displaystyle \beta =\frac{{\epsilon }_{0}hc}{2e^2}=\frac{h}{2c{\mu }_0{e}^2}=\frac{1}{4\alpha }=34.258999743}$.

Stoney electrodynamic impedance quantum:

${\displaystyle R_e=\frac{q_m}{e}=\frac{h}{e^2}=25,812.807449}$ Ohm

which appears as the von Klitzing constant.

All systems of measurement feature is base units: in the International System of Units (SI), for example, the base unit of length is the meter. In the system of Stoney units, the Stoney base unit of length is known simply as the ‘’Stoney length’’, the base unit of time is the ‘’Stoney time’’, and so on. These units are derived from the presented above primary Stoney units, and arranged in Table 1 so as to cancel out the unwanted dimensions, leaving only the dimension appropriate to each unit. (Like all systems of natural units, Stoney units are an instance of dimensional analysis.)

The keys which are used in the Tables below: L = length, T = time, M = mass, Q = electric charge, Θ = temperature.

Table 1: Secondary Stoney units

Name	Dimension	Expressions	SI equivalent [4]
Stoney wavelength	Length (L)	${\displaystyle {\lambda }_S=\frac{h}{m_{S}c}}$	${\displaystyle 1.18876\cdot 10^{-33}}$ m
Stoney time	Time (T)	${\displaystyle t_S=\frac{{\lambda }_S}{c}}$	${\displaystyle 3.96528\cdot 10^{-42}}$ s
Stoney classical radius	Length (L)	${\displaystyle r_{Sc}=\frac{\alpha {\lambda }_S}{2\pi }}$	${\displaystyle 1.38064\cdot 10^{-36}}$ m
Stoney Schwarzschild radius	Length (L)	${\displaystyle r_{SS}=\frac{2G{m}_S}{c^2}=2r_{Sc}}$	${\displaystyle 2.76127\cdot 10^{-36}}$ m
Stoney temperature	Temperature (Θ)	${\displaystyle T_S=\frac{m_S{c}^2}{k_B}}$	${\displaystyle 1.21032\cdot 10^{31}}$ K

In any system of measurement, units for many physical quantities can be derived from base units. Table 2 offers a sample of derived Stoney units, some of which in fact are seldom used. As with the base units, their use is mostly confined to theoretical physics because most of them are too large or too small for empirical or practical use and there are large uncertainties in their values.

Table 2: Derived Stoney units

Name	Dimensions	Expression	SI equivalent
Stoney area	Area (L2)	${\displaystyle {\lambda }_S^2=\frac{h}{2\alpha {\epsilon }_g{c}^3}}$	${\displaystyle 1.4127\cdot 10^{-66}}$ m2
Stoney volume	Volume (L3)	${\displaystyle {\lambda }_S^3={\left(\frac{h}{m_{S}c}\right)}^3}$	${\displaystyle 1.6794\cdot 10^{-99}}$ m3
Stoney momentum	Momentum (LMT −1)	${\displaystyle m_{S}c=\frac{h}{{\lambda }_S}}$	${\displaystyle 5.5739\cdot 10^{-1}}$ kg m/s
Stoney energy	Energy (L2MT −2)	${\displaystyle W_S=m_S{c}^2}$	${\displaystyle 1.6710\cdot 10^8}$ J
Stoney force	Force (LMT −2)	${\displaystyle F_S=\frac{W_S}{{\lambda }_S}=\frac{m_S{c}^2}{{\lambda }_S}}$	${\displaystyle 1.4057\cdot 10^{41}}$ N
Stoney power	Power (L2MT −3)	${\displaystyle P_S=\frac{m_S{c}^2}{t_S}}$	${\displaystyle 4.2141\cdot 10^{49}}$ W
Stoney density	Density (L−3M)	${\displaystyle {\rho }_{Sm}=\frac{m_S}{{\lambda }_S^3}}$	${\displaystyle 1.1071\cdot 10^{90}}$ kg/m3
Stoney angular frequency	Frequency (T −1)	${\displaystyle {\omega }_S=\frac{2\pi }{t_S}=\frac{2\pi c}{{\lambda }_S}}$	${\displaystyle 1.5846\cdot 10^{42}}$ rad s−1
Stoney pressure	Pressure (L−1MT −2)	${\displaystyle p_S=\frac{F_S}{{\lambda }_S^2}=\frac{m_S{c}^2}{{\lambda }_S^3}}$	${\displaystyle 9.9504\cdot 10^{106}}$ Pa
Stoney current	Electric current (QT −1)	${\displaystyle I_S=\frac{q_S}{t_S}=\frac{ec}{{\lambda }_S}}$	${\displaystyle 4.0405\cdot 10^{22}}$ A
Stoney voltage	Voltage (L2MT −2Q−1)	${\displaystyle V_S=\frac{W_S}{q_S}=\frac{m_S{c}^2}{e}}$	${\displaystyle 1.0429\cdot 10^{27}}$ V
Stoney electric impedance	Resistance (L2MT −1Q−2)	${\displaystyle R_{ES}=\frac{V_S}{I_S}=\frac{h}{e^2}}$	${\displaystyle 2.5813\cdot 10^4}$ Ohm
Stoney gravitational current	Gravitational current (MT −1)	${\displaystyle I_{GS}=\frac{m_S}{t_S}=\frac{m_S^2{c}^2}{h}}$	${\displaystyle 4.6889\cdot 10^{32}}$ kg s−1
Stoney gravitational potential	Gravitational potential (L2T −2)	${\displaystyle V_{GS}=\frac{W_S}{m_S}=c^2}$	${\displaystyle 8.9875\cdot 10^{16}}$ m2 s−2
Stoney gravitational impedance	Gravitational impedance (L2M −1T −1)	${\displaystyle R_{GS}=\frac{V_{GS}}{I_{GS}}=\frac{h}{m_S^2}}$	${\displaystyle 1.9168\cdot 10^{-16}}$ m2 kg−1 s−1
Stoney electric capacitance per unit area	Electric capacitance (L−4M−1T2Q2)	${\displaystyle C_{ES}=\frac{e}{V_S{\lambda }_S^2}=\frac{2{\epsilon }_0\alpha }{{\lambda }_S}}$	${\displaystyle 1.0870\cdot 10^{20}}$ F m−2
Stoney electric inductance per unit area	Electric inductance (L2MQ−2)	${\displaystyle L_{ES}=R_{ES}{t}_S=\frac{{\mu }_0}{2\alpha {\lambda }_S}}$	${\displaystyle 7.2430\cdot 10^{28}}$ H m−2
Stoney gravitational capacitance per unit area	Gravitational capacitance (L−4MT2 )	${\displaystyle C_{GS}=\frac{m_s}{V_{GS}{\lambda }_S^2}=\frac{2{\epsilon }_g\alpha }{{\lambda }_S}}$	${\displaystyle 1.4643\cdot 10^{40}}$ m−4 kg s2
Stoney gravitational inductance per unit area	Gravitational inductance (L2M−1)	${\displaystyle L_{GS}=R_{GS}{t}_S=\frac{{\mu }_g}{2\alpha {\lambda }_S}}$	${\displaystyle 5.3769\cdot 10^8}$ m2 kg−1
Stoney particle radius	Length (L)	${\displaystyle r_S=\frac{{\lambda }_S}{2\pi \sqrt{2}}}$	${\displaystyle 1.3378\cdot 10^{-34}}$ m
Stoney particle area	Area (L2)	${\displaystyle S_S=4\pi r_S^2=\frac{{\lambda }_S^2}{2\pi }}$	${\displaystyle 2.2491\cdot 10^{-67}}$ m2

Electric Stoney scale force:

${\displaystyle F_S(q_S,q_S)=\frac{1}{4\pi {\epsilon }_0}\cdot \frac{e^2}{r^2}=\frac{\alpha \hslash c}{r^2}.}$

Gravity Stoney scale force:

${\displaystyle F_S(m_S,m_S)=\frac{1}{4\pi {\epsilon }_g}\cdot \frac{m_S^2}{r^2}=\frac{{\alpha }_S\hslash c}{r^2},}$

where ${\displaystyle {\alpha }_S=\frac{m_S^2}{2hc{\epsilon }_g}=\alpha }$ is the gravitational fine structure constant.

Mixed (charge-mass interaction) Stoney force:

${\displaystyle F_S(m_S,q_S)=\frac{1}{4\pi \sqrt{{\epsilon }_g{\epsilon }_0}}\cdot \frac{m_S\cdot e}{r^2}=\sqrt{{\alpha }_S\alpha }\frac{\hslash c}{r^2}=\frac{\alpha \hslash c}{r^2}.}$

So, at the Stoney scale we have the equality of all static forces which describes interactions between charges and masses:

${\displaystyle F_S(q_S,q_S)=F_S(m_S,m_S)=F_S(m_S,q_S)=\frac{\alpha \hslash c}{r^2}.}$

Magnetic Stoney scale force:

${\displaystyle F_S(q_m,q_m)=\frac{1}{4\pi {\mu }_0}\cdot \frac{q_m^2}{r^2}=\frac{\beta \hslash c}{r^2},}$

where ${\displaystyle q_m=\frac{h}{e}}$ is the fictitious elementary magnetic charge, ${\displaystyle \beta =\frac{h}{2c{\mu }_0{e}^2}}$ is the magnetic coupling constant.

Gravitational torsion force:

${\displaystyle F_S(m_{\mathrm{\Omega }},m_{\mathrm{\Omega }})=\frac{1}{4\pi {\mu }_{g0}}\cdot \frac{m_{\mathrm{\Omega }}^2}{r^2}=\frac{{\beta }_g\hslash c}{r^2},}$

where ${\displaystyle m_{\mathrm{\Omega }}=\frac{h}{m_S}}$ is the fictitious gravitational torsion mass, ${\displaystyle {\beta }_g=\frac{{\epsilon }_{g}hc}{2m_S^2}=\frac{h}{2c{\mu }_{g0}{m}_S^2}=\beta }$ is the gravitational torsion coupling constant for the gravitational torsion mass ${\displaystyle m_{\mathrm{\Omega }}}$.

Mixed dynamic (magnetic - torsion interaction) force:

${\displaystyle F_S(q_m,m_{\mathrm{\Omega }})=\frac{1}{4\pi \sqrt{{\mu }_{g0}{\mu }_0}}\cdot \frac{q_m\cdot m_{\mathrm{\Omega }}}{r^2}=\sqrt{{\beta }_g\beta }\frac{\hslash c}{r^2}=\frac{\beta \hslash c}{r^2}.}$

So, at the Stoney scale we have the equality of all dynamic forces which describes interactions between dynamic charges and masses:

${\displaystyle F_S(q_m,q_m)=F_S(m_{\mathrm{\Omega }},m_{\mathrm{\Omega }})=F_S(q_m,m_{\mathrm{\Omega }})=\frac{\beta \hslash c}{r^2}.}$

• Planck scale
• Stoney mass
• Selfconsistent gravitational constants
• Selfconsistent electromagnetic constants
• Maxwell-like gravitational equations
• Quantum Gravitational Resonator

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