Corpus ID: 119019989

# EPR-Bell realism as a part of logic

@article{Schmelzer2017EPRBellRA,
title={EPR-Bell realism as a part of logic},
author={I. Schmelzer},
journal={arXiv: General Physics},
year={2017}
}
• I. Schmelzer
• Published 2017
• Physics
• arXiv: General Physics
• If one identifies with EPR-Bell realism all that is necessary beyond Einstein causality to prove the Bell inequality, this reduces to the hypothesis that one can construct a space $\Lambda$ with a probability distribution $\rho(\lambda)$ and functions $A(a,b,\lambda)$, $B(a,b,\lambda)$ so that the formula $E(AB|a,b) = \int A(a,b,\lambda)B(a,b,\lambda)\rho(\lambda) d\lambda$ defines the expectation value for the product $AB$ in dependence of the decisions $a,b$ of the experimenters. Given that… CONTINUE READING

#### References

##### Publications referenced by this paper.
SHOWING 1-10 OF 14 REFERENCES
Probability Theory: The Logic of Science
• 1,848
• Highly Influential
Interpretations of Probability
• 259
• Highly Influential
Probability, frequency and reasonable expectation
• 1,164
• Highly Influential
Constructive Mathematics, in Zalta, E.N. (ed.), The Stanford Encyclopedia of Philosophy (Winter 2016 Edition)
• 2016