\omega is the fundamental frequency of the time resonance (its scalar parameter can be related to the synchronization intensity).
()\phi(\psi)() is a weighting or modulation function that represents the influence of consciousness on resonance.
6.b Derivation and Solution of Equations
6.b.1 Reviewing the Properties of Resonance Functions
This resonance function depends on the relative time trt_rtr and the consciousness \psi, and acts as a harmonic wave indicating synchronization with the absolute time t0t_0t0.
For deeper analysis, we can express the dynamic relationship in differential form.
6.b.2 Differential Resonance Function with respect to relative time trt_rtr:
Rtr=trcos((trt0)())\frac{\partial R}{\partial t_r} = \frac{\partial}{\partial t_r} \cos \big( \omega (t_r - t_0) \phi(\psi) \big)trR=trcos((trt0)())
Use the derivative of the cosine function:
Rtr=sin((trt0)())()\frac{\partial R}{\partial t_r} = -\sin \big( \omega (t_r - t_0) \phi(\psi) \big) \cdot \omega \phi(\psi)trR=sin((trt0)())()
6.b.3 Resonance Differential Equations
