The Einstein gravitational
constant (Κ) is usually written as;
Κ = 8πG/c4
Can this constant be represented
as wave-particle ratios of forces?
Is there any reference in the
literature to these ratios?
The ratios may be defined as
follows.
Assume; Κ = RThermal/RParticle
Where; RThermal is a ratio of thermal forces
(wave forces) RThermal
= FTP/FTH
RParticle
is a ratio of particle forces RParticle
= FP/FP0
A force magnitude (Fn)
may be defined as; Fn = En2/ħc
Where; En is energy
ħ is the reduced Plank constant (fundamental angular
momentum)
c
is the light constant
The thermal force definitions
are; FTP = (kBTP)2/ħc
FTH = (hc/λH)(kBTH)/ħc
Where; kB is the Boltzmann constant
TP
is Plank temperature
TH
is Hawking temperature
h
is the Plank constant
ħ is the reduced Plank constant (ħ = h/2π)
λH
is wavelength
The particle force definitions
are; FP is Plank
force
FP0 = EP02/ħc
Where; EP0 = mPG½
mP
is Plank mass
G
is the gravitational constant
The ratio of force ratios gives
the invariant ‘Κ’ ; Κ(FP/FP0)
= (FTP/FTH)
ΚRParticle = RThermal
Thermal energy requires; hc/λH = mc2
What is the significance of EP0?
Thanks
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