# Do Reichenbachian Common Cause Systems of Arbitrary Finite Size Exist?

**Authors:** Claudio Mazzola, Peter Evans

arXiv: 1703.00352 · 2017-12-06

## TL;DR

This paper critiques and improves upon a previous proof regarding the existence of Reichenbachian common cause systems of arbitrary finite size for non-causally correlated events.

## Contribution

It identifies flaws in the 2006 proof and provides a corrected, logically sound proof of the existence of such common cause systems.

## Key findings

- The original proof by Hofer-Szabó and Rédei is flawed.
- The paper offers a valid proof for the existence of Reichenbachian common cause systems.
- It clarifies the conditions under which these systems exist.

## Abstract

The principle of common cause asserts that positive correlations between causally unrelated events ought to be explained through the action of some shared causal factors. Reichenbachian common cause systems are probabilistic structures aimed at accounting for cases where correlations of the aforesaid sort cannot be explained through the action of a single common cause. The existence of Reichenbachian common cause systems of arbitrary finite size for each pair of non-causally correlated events was allegedly demonstrated by Hofer-Szab\'o and R\'edei in 2006. This paper shows that their proof is logically deficient, and we propose an improved proof.

## Full text

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## References

9 references — full list in the complete paper: https://tomesphere.com/paper/1703.00352/full.md

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Source: https://tomesphere.com/paper/1703.00352