The five fundamental axioms of classical probability theory
were put forward in 1933 by Andrey Nikolaevich Kolmogorov. Encompassing new
imaginary dimensions with the experiment real dimensions will make the work in
the complex probability set totally predictable and with a probability
permanently equal to one. This is the original idea in my complex probability
paradigm. Therefore, this will make the event in C = R + M absolutely
deterministic by adding to the real set of probabilities R the contributions of
the imaginary set of probabilities M. It is of great importance that stochastic
systems become totally predictable since we will be perfectly knowledgeable to
foretell the outcome of all random events that occur in nature. Consequently,
by calculating the parameters of the new prognostic model, we will be able to
determine the magnitude of the chaotic factor, the degree of our knowledge, the
real and imaginary and complex probabilities in the probability sets R and M
and C and which are all subject to chaos and random effects. Hence, we will
apply this novel paradigm to the law of large numbers in order to demonstrate
it in an innovative way and to prove as well in an original way an important
property at the foundation of statistical physics.
Author(s) Details:
Abdo Abou Jaoudé,
Department of Mathematics and Statistics, Faculty of Natural and
Applied Sciences, Notre Dame University-Louaize, Lebanon.
Please see the link here: https://stm.bookpi.org/TPCPLLNCLT/article/view/13493
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