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  1. Determinism, Predictability and Chaos.G. M. K. Hunt - 1987 - Analysis 47 (3):129 - 133.
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  • Chaos, prediction and laplacean determinism.M. A. Stone - 1989 - American Philosophical Quarterly 26 (2):123--31.
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  • Order out of Chaos.Ilya Prigogine & Isabelle Stengers - 1985 - British Journal for the Philosophy of Science 36 (3):352-354.
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  • Randomness and probability in dynamical theories: On the proposals of the Prigogine school.Robert W. Batterman - 1991 - Philosophy of Science 58 (2):241-263.
    I discuss recent work in ergodic theory and statistical mechanics, regarding the compatibility and origin of random and chaotic behavior in deterministic dynamical systems. A detailed critique of some quite radical proposals of the Prigogine school is given. I argue that their conclusion regarding the conceptual bankruptcy of the classical conceptions of an exact microstate and unique phase space trajectory is not completely justified. The analogy they want to draw with quantum mechanics is not sufficiently close to support their most (...)
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  • Critical notice: John Earman's a Primer on determinism.Mark Wilson - 1989 - Philosophy of Science 56 (3):502-532.
    Your story is there waiting for you, it has been waiting for you there a hundred years, long before you were born and you cannot change a comma of it. Everything you do you have to do. You are the twig, and the water you float on swept you here. You are the leaf, and the breeze you were borne on blew you here. This is your story and you cannot escape it.—Cornell Woolrich, I Married a Dead Man.
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  • Computable chaos.John A. Winnie - 1992 - Philosophy of Science 59 (2):263-275.
    Some irrational numbers are "random" in a sense which implies that no algorithm can compute their decimal expansions to an arbitrarily high degree of accuracy. This feature of (most) irrational numbers has been claimed to be at the heart of the deterministic, but chaotic, behavior exhibited by many nonlinear dynamical systems. In this paper, a number of now classical chaotic systems are shown to remain chaotic when their domains are restricted to the computable real numbers, providing counterexamples to the above (...)
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  • Models, Chaos, and Goodness of Fit.Stephen H. Kellert, Mark A. Stone & Arthur Fine - 1990 - Philosophical Topics 18 (2):85-105.
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