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  Movement of simple wave through the field.  u  182 KB monochrome

    Slow speed animation of a simple wave, obeying all the applicable rules of dynamic geometry, i.e., orthogonal motion, exchange of object of motion to motion and relativity at its most fundamental level.  The simple wave can move in any direction through the field;  essentially having a spin equivalence of zero.
    Animation demonstrates normal propagation through an isotropic field of sufficient density to allow marginal stability of the simple wave, at first without decay (auto convolution), and then with decay through the first stages of decay marked by the wave's first interaction with itself.
    The straight vertical lines represent surfaces as they cut through a common flat plane parallel to the monitor you are viewing.  In this example, the field is a unique field of parallel and flat surfaces.
    The wave, disturbing these surfaces (lines as they appear), is a nearly circular bulging of surfaces, as illustrated.
    Only if the wave undergoes interchange with field surfaces, may it continue to propagate.
    In the last sequence steps, the wave fails to undergo interchange, a matter of 0.5 probability, eventually turning back on itself, producing its own decay products of smaller waves, presumably neutrinos, they themselves unable to propagate any distance at all, repeating the process of decay and the production of many more smaller waves.