If entanglement occurs along the time dimensions, that implies \(\psi\) exist along the time dimensions. If we solve for \(\psi\) from previous posts but replaces \(x\) with \(t_c\) or \(t_g\) we would then obtain \(\psi_{tc}\) and \(\psi_{tg}\) and correspondingly \(F_{\rho\,tc}\) and \(F_{\rho\,tg}\).
Similarly, along the time dimensions, we have matter-wave duality,
\(q_{\rho\,p} c^2=q_\rho c^2-\int^{2t_{c\,z}}_{0}{\psi}d\,t_{c}\)
where \(x\) has been replaced with \(t_c\) and \(q_\rho\) and \(q_{\rho\,p}\) are inertia (charge density) along the time dimension \(t_c\).
Analogously for time dimension \(t_g\),
\(m_{g\rho\,p} c^2=m_{g\rho} c^2-\int^{2t_{g\,z}}_{0}{\psi}d\,t_{g}\)
where \(m_{g\rho}\) is the gravity particle along \(t_g\).
This line of thinking leads to an alternate view of \(t\) with respect to \(t_c\) and \(t_g\); that \(t\) is just like the third dimension of space and exist independently of \(t_c\) and \(t_g\) and
\(t^2\ne t^2_g+t^2_c\)
as was previously proposed. But
\(t^2_{now}=t^2+t^2_g+t^2_c\)
where \(t_{now}\) is our consciousness.
If \(t_g\) gives us gravity and \(t_c\) gives us charge then \(t\) being the third independent time dimension gives us, what?
