User:Dennismelton/Perivity

Perivity is known as the perpendicular component to gravity, and is unified by the speed of light and mass. It is proposed that the electromagnetic spectrum is unified though a mass electric equivalence defined as perogravity.

This is a revolutionary new theory that has been published here in its originality. Basically if perivity is unified with gravity in the same way as magnetism is with electricity then it is possible that there is physical conditions that can cause a unified singular force where all the forces are the same.

Dennis William Melton David Castro Rodrigues

Mathematical Model
Can you give the analog of Maxwell's Equations for your model of an orthogonal component to gravity? How would you measure the analogs of ε0 and μ0 for your analogous model? —Caprice 12:36, 13 January 2011 (UTC)

Quantum Electro Gravity the Analogous Model Unification
In e/m the electric field and magnetic field relate E/B = c in perogravity G/P = Uμ velocity four-vector Uμ. That is my first step in calculating analogous μ and ε. Or in other words the same as E/B = γv where γ = 1/(1-β^2)^(1/2) β = v/c. Since the equations are unified they begin to behave the same. For G/P or g/p for perogravity the orthogonal waves are solutions to the wave equation for v => c. Such that there is a relativistic ε and μ. I suggest using just Uμ for both e/m and g/p to get e/g electro gravity. At least that is my starting point. 1/(εμ)^2 = c then in reality it is 1/(εμ)^2 = Uμ. I guess there is a four permittivity and permeability equivalence for e/g I just call them special four permittivity and permeability respectively. From here the question of how does that fit in with the rest of physics in terms of QED and quantum gravity. QEG is quantum electro gravity and the equations of qed are summed to get the orthogonal quantum components of perogravity. To be cont... but the whole of perogravity or perivity definition is to include QEG because just saying that the equations are the same isn't enough. Well that is my analogous g/p to e/m. Basically just replace c with γv and that would be how g/p is like e/m.

Unified QEG
In qed we arive at a probability density ψ*ψ for E and B the same is for g/p but at this point I do something different but it should seem familar. I optimize the combined likelihood to measure parameters using parameter estimation. Here is how: for each probability the ψ*ψ_ijk.. I compute the temperature of the distribution using 1/T = k d/dq (ln ∏ ψ*ψ_ijk...)_q where ∏ is the multiplication over all of the states of ψ*ψ_ijk... and ijk... represents the number of parameters in ψ*ψ. d/dq just represents that for that parameter space that the distribution should be optimized and as a bonus it can be used to calculate the temperature. k is just the standard bolzman k. Next I construct a similar equation and then compare their likelihood ratio to get a conservative force. L = ∏ ψ*ψ_ijk...)_q2 thus I get R = ln L_1/L_2 which corresponds to a conservative force = R = ln L_1 - ln L_2 ≈ g(1/r^2) where g is gravitational constants associated with the conservative force of gravity combined with whatever other charge interactions and perivity that are in L_1 and L_2 . Then calculate k(dR/dq) for the change in temperature ∆T_⊥ perpendicular. The orthogonal change in temperature ∆T_∥ shouldn't be the same.  ∆T_⊥ and  ∆T_∥ can be summed together to produce an orthogonal ∆T_∥/∆T_⊥ wave that has a composite field theory  ∆T_∥/∆T_⊥ = ∑Uμ = ∑ 1/(εμ_ijk..)^2 where Uμ is the velocity four vector and εμ is the special permittivity and permeability. This reduces to E/B = c for e/m and G/P = Uμ for g/p. QEG. There should be orthogonal components to all of the forces with a velocity four vector for each strong, weak, e/m, and gravity. Unified QEG.  Note that all forces should be associated with a standard temperature fluctuation or contributed kinetic energy range. Dennis William Melton David Castro Rodrigues