TITLE:
The Bell Inequalities: Identifying What Is Testable and What Is Not
AUTHORS:
Louis Sica
KEYWORDS:
Bell Theorem, Bell Inequality, Entanglement, Locality, Correlations, Hidden Variables, Non-Commutation, Commutation, Cross-Correlations, Non-Stationary
JOURNAL NAME:
Journal of Modern Physics,
Vol.11 No.5,
May
18,
2020
ABSTRACT: The Bell theorem and inequality were derived as consequences of seemingly reasonable physical and statistical hypotheses. Bell’s assumptions were used to deduce cross-correlations of three spin measurements on two entangled particles neglecting non-commutation. The assumed correlation functions, later confirmed for certain quantum measurements, violate the Bell inequality. The present paper reviews a more general derivation of the Bell inequality showing that it is identically satisfied by finite data sets whether deterministic or random, after assuming merely that they exist. It is thereafter concerned with the consequences of this result for interpretations of the inequality that result in its violation. A primary finding is that correlation functions have differing forms due to quantum commutation, non-commutation, and conditions of measurement, and result in satisfaction of the Bell inequality used consistently with its derivation. A stochastic process having the same correlation function for all variable pairs is shown to be inconsistent with experimentally reported data. The logic of the three and four variable inequalities is shown to be similar. Finally the inequalities in probabilities are shown to follow from those in correlations with quantum mechanical results satisfying either when properly implemented.