Kaula's rule is a consequence of probability laws by A. N. Kolmogorov and his school

Abstract

At the beginning of 1930-s A. N. Kolmogorov has published three papers on analytical methods for the probability theory. The two-page work had the essence of the approach started by A. Einstein and developed further by Fokker and Planck. He proposed a fundamental solution for evolution description of the 6D vector of the probability distribution at the Markov character of action which in modern terms is usually called as time delta-correlated acceleration. This is an approximation of processes when correlation time of random forces is much smaller than the reaction time of the system in consideration.