Plank says six deviations must be distributed over one trip through the error tree. In the simplest form that is three trips, three time by light. But light gets a break when a color turns, i is right break to the top. The deviation count is minimum at the operator boundary. Light gets any zero count free because it generally dispenses two deviations on the second step down, not the third.
Light can dump two or accumulate one deviation. So we can see light and Planck are almost one in the same, except for Boltzmann and path thinning. Path thinning is why light get the short trip on a roll over. Boltzman dumped about 6 paths n the simplest case where factorial was ten.
The way to get Plank is to get Avogadro and find the inversion of the one into the other for a very smooth sphere. Then convert a ball of N into whatever engineer units you like, Measure the most uniform spherical gas, in the lowest gas energy state. Mark that pressure, mark that volume, now you have units hat scale. Find out where that proton is on the Markov tree. How many actions does it take for one proton to maintain a bounded set of deviations. Get an N from that. If you took your standard ball of gas and could reduce N, and the residual gas begins to change phase, count how much N you removed from Avadadros and use the reduced N on the proton, and see if the aliasing effect shows; the get Bosson statistics. Most of the N remaining go crammed iinto those protons. Get the real number. Find the proton curvature under the under as Area to volume is mass.mpling.
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