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    In the four-chain distribution of tokens (G-chains and H-... — Carmelics
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    Supports→Causal loops are impossible under Mellor's probabilistic account of causation.

    In the four-chain distribution of tokens (G-chains and H-chains), the number of chains combining b with a equals the number of chains not combining b with a.

    CausationModality & Possibility
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    Modality & PossibilityCausation

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    Causal loops are impossible under Mellor's probabilistic account of causation.If a does not raise the probability of b, then a cannot causally affect b under ...If no event in a causal loop can affect the next event, causal loops cannot obta...Mellor defines a causal relation between singular events a and b as a situation ...

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    When the number of chains combining b with a equals those not combining b with a...

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    When the number of chains combining b with a equals those not combinin...81%In Mellor's G&H world, the number of G-chains and H-chains is equal, m...77%Mellor's argument relies on an equal distribution of G-chains and H-ch...75%Mellor does not prove the result generalizes to worlds where G-chains ...74%

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    The first two sequences may be called G-chains and the other two H-chains. Moreover, Mellor assumes that all tokens of \(A, B\) and \(C\) are distributed among the four chains so that the number of chains is exactly the same, namely one fourth of the sequences. Mellor then defines a causal relation between two singular events \(a\) and \(b\) in terms of a situation \(k\) which makes \(b\) more likely to occur given \(a\) than without \(a\), i.e., \(\rP(b\mid a) \gt \rP(b\mid {\sim}a)\). But we c

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