Open AccessWhen Intrinsic Randomness Could Come From the Finite/Infinite Transition
Publication year - 2019
Publication title -
advances in theoretical and computational physics
Language(s) - English
Resource type - Journals
ISSN - 2639-0108
DOI - 10.33140/atcp.02.04.04
Subject(s) - randomness , interpretations of quantum mechanics , axiom , hilbert space , causality (physics) , theoretical physics , mathematics , interpretation (philosophy) , physics , universe , space (punctuation) , statistical physics , quantum , classical mechanics , quantum mechanics , pure mathematics , quantum process , computer science , quantum dynamics , geometry , statistics , programming language , operating system
Quantum physics is non-causal, and randomness is so-called “intrinsic”. We propose no less than an 18th interpretation ofit through non-Archimedean geometry to bring back causality, respect of the Kolmogorov axioms and the existence of hiddenvariables. For these latter ones, we show that they cannot be in any Hilbert space and hence could not be detected in any traditionalexperiment. We end through proposing two experiments which would prove the non-Archimedean nature of our universe. Thefirst one consists in a new disruptive type of quantum radar. The second one explains how viscosity naturally occurs in fluidmechanics whereas Boltzmann’s approach only considers elastic shocks at the molecular scale.