Well, this page contained zero for a while, but now has been instaced. Some of my favorite equations are
But don't let that put you off. All of them are beautiful in both character and pattern. The first origionates from an idea of bulk force action through infinity and counter reaction to locality. The second is what I called the closure equation, and was found during my investigations into the analytical parameterization of calculus. The third is gem hiding inside number theory, and rates as my favorite teaching. The last is De Moivre's theorem and contains spectacular symetry from complex analysis.
There are probably others of similar charm, but this is just an aside to the main site. It does make me wonder though if the following holds any promise.
Where m and E represent the rest mass and energy of a "particle-wave" and k is the Jaxon constant, and phi is the wave function. It comes from a bit of quantum physics combined with the partics equation above. And k would not necessarily be the inverse of the Dirac constant due to the nature of partics dipoles and quadrapoles having a lower force sum than individual partics.
And been a cubic there may be some relation to cubic class genera groups and the eleventh dimension, and elimination of the singularity of the logarithm forces. In the end I think
It has the best matching and I call it the Dirac-Jaxon partics equation. The subscript 0 was replaced by p to indicate this change in the scale brought about by shrinking the forces down to force deltas and how this would possibly effect the rest energy and rest mass of a partic of a particle. I just wonder how much a tripole and a quadrapole representation of a particals partics would differ.