The Structure of the Scalar Potential: According to rigorous proofs by Whittaker[2] and Ziolkowski,[3] any scalar potential can be mathematically decomposed into a harmonic series of bidirectional wave pairs. Figure 1 shows this Whittaker/Ziolkowski (WZ) structure. In each pair, the forward-time wave is going in one direction, and its phase conjugate time-reversed replica wave is going in the other. According to the so-called distortion correction theorem[4] of nonlinear phase conjugate optics, this phase conjugate replica wave (PCR) wave must precisely superpose spatially with its partner wave in the pair. The two waves are in-phase spatially, but 180 degrees out of phase in time. The wave is made of photons, and the antiwave (phase conjugate replica wave) is made of antiphotons. It follows that, as wave and antiwave pass through each other, the photons and antiphotons are coupling and uncoupling with each other, because the antiphoton is a (phase conjugate replica) (PCR) photon, and phase conjugate replica (PCR)'s precisely superpose spatially with their partner. A photon or antiphoton has wave characteristics, because it has a frequency; if the wave aspects are perfectly ordered and perfectly correlated, then so are the photon's particle aspects. [Bearden, The Final Secret of Free Energy]
See Also
Bidirectional wave pair
Entropy
Father-Mother
mate-pairs
Reciprocal
Wave Pair
wave unit