The Wave Function of Rest Mass

For Donald C. Chang, the rest mass of a particle is related to a transversal distribution of the amplitude of its wave function. We have computed the transversal distributions of the density of presence of a particle from the amplitudes of its wave function, we have drawn their surface graphs. As a consequence of the wave nature of particles, transversal distibutions show a serie of maxima and minima which depend of a Bessel function Jn of order n. At the zero radius the density is a maximum for n=0 and it is a null minimum for n>0 which defines a hollow mass.

For John E. Carroll, the rest mass of a particle should correspond to variations in a hidden transversal time of a 3+3 space-time. We have computed these variations and we have found that there is a photon correlation in the hidden time, and that the rest mass might correspond to oscillations for superluminal particles, but direct or inverse exponential variations for subluminal particles.