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  1. The Direction of Time.Hans Reichenbach - 1956 - Philosophy 34 (128):65-66.
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  • (1 other version)What Is Mathematical Logic?John Corcoran - 1976 - Philosophy of Science 43 (2):301-302.
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  • The Character of Physical Law.Richard Phillips Feynman - 1965 - MIT Press.
    The law of gravitation, an example of physical law The relation of mathematics to physics The great conservation principles Symmetry in physical law The distinction of past and future Probability and uncertainty: the quantum mechanical view of nature Seeking new laws.
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  • (1 other version)The direction of time.Hans Reichenbach - 1956 - Mineola, N.Y.: Dover Publications. Edited by Maria Reichenbach.
    The final work of a distinguished physicist, this remarkable volume examines the emotive significance of time, the time order of mechanics, the time direction of thermodynamics and microstatistics, the time direction of macrostatistics, and the time of quantum physics. Coherent discussions include accounts of analytic methods of scientific philosophy in the investigation of probability, quantum mechanics, the theory of relativity, and causality. "[Reichenbach’s] best by a good deal."—Physics Today. 1971 ed.
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  • Indispensability arguments in the philosophy of mathematics.Mark Colyvan - 2008 - Stanford Encyclopedia of Philosophy.
    One of the most intriguing features of mathematics is its applicability to empirical science. Every branch of science draws upon large and often diverse portions of mathematics, from the use of Hilbert spaces in quantum mechanics to the use of differential geometry in general relativity. It's not just the physical sciences that avail themselves of the services of mathematics either. Biology, for instance, makes extensive use of difference equations and statistics. The roles mathematics plays in these theories is also varied. (...)
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  • The conceptual contingency of mathematical objects.Hartry Field - 1993 - Mind 102 (406):285-299.
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  • On the method of theoretical physics.Albert Einstein - 1934 - Philosophy of Science 1 (2):163-169.
    If you wish to learn from the theoretical physicist anything about the methods which he uses, I would give you the following piece of advice: Don't listen to his words, examine his achievements. For to the discoverer in that field, the constructions of his imagination appear so necessary and so natural that he is apt to treat them not as the creations of his thoughts but as given realities.
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  • The principle of the common cause.Miklós Redei, Gabor Hofer-Szabo & Laszlo Szabo - 2013 - Cambridge, U.K: Cambridge University Press. Edited by Miklós Rédei & László E. Szabó.
    The common cause principle says that every correlation is either due to a direct causal effect linking the correlated entities or is brought about by a third factor, a so-called common cause. The principle is of central importance in the philosophy of science, especially in causal explanation, causal modeling and in the foundations of quantum physics. Written for philosophers of science, physicists and statisticians, this book contributes to the debate over the validity of the common cause principle, by proving results (...)
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  • What Is Mathematical Logic?J. N. Crossley - 1975 - Critica 7 (21):120-122.
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  • Review of T he Direction of Time.Henryk Mehlberg - 1962 - Philosophical Review 71 (1):99.
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  • Outlines of a formalist philosophy of mathematics.Haskell Brooks Curry - 1951 - Amsterdam,: North-Holland Pub. Co..
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  • Machines, logic and quantum physics.David Deutsch, Artur Ekert & Rossella Lupacchini - 2000 - Bulletin of Symbolic Logic 6 (3):265-283.
    §1. Mathematics and the physical world. Genuine scientific knowledge cannot be certain, nor can it be justified a priori. Instead, it must be conjectured, and then tested by experiment, and this requires it to be expressed in a language appropriate for making precise, empirically testable predictions. That language is mathematics.This in turn constitutes a statement about what the physical world must be like if science, thus conceived, is to be possible. As Galileo put it, “the universe is written in the (...)
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  • The theory of relativity and a priori knowledge.Hans Reichenbach - 1965 - Berkeley,: University of California Press. Edited by Maria Reichenbach.
    The Theory of Relativity and A Priori Knowledge will hereafter be cited as "RAK. " The German edition is out of print. 2 H. Reichenbach, The Philosophy of ...
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  • Mathematical Facts in a Physicalist Ontology.Laszlo E. Szabo - unknown
    If physicalism is true, everything is physical. In other words, everything supervenes on, or is necessitated by, the physical. Accordingly, if there are logical/mathematical facts, they must be necessitated by the physical facts of the world. The aim of this paper is to clarify what logical/mathematical facts actually are and how these facts can be accommodated in a purely physical world.
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  • Mathematical Contingentism.Kristie Miller - 2012 - Erkenntnis 77 (3):335-359.
    Platonists and nominalists disagree about whether mathematical objects exist. But they almost uniformly agree about one thing: whatever the status of the existence of mathematical objects, that status is modally necessary. Two notable dissenters from this orthodoxy are Hartry Field, who defends contingent nominalism, and Mark Colyvan, who defends contingent Platonism. The source of their dissent is their view that the indispensability argument provides our justification for believing in the existence, or not, of mathematical objects. This paper considers whether commitment (...)
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  • (2 other versions)Outlines of a Formalist Philosophy of Mathematics.J. C. C. McKinsey - 1953 - Journal of Symbolic Logic 18 (1):80-81.
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  • Outlines of a Formalist Philosophy of Mathematics.Haskell B. Curry & Abraham Robinson - 1952 - British Journal for the Philosophy of Science 3 (10):197-200.
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  • (1 other version)The Character of Physical Law.Alex C. Michalos - 1967 - Philosophy of Science 34 (2):194-194.
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  • (4 other versions)Language, Truth and Logic.[author unknown] - 1937 - Erkenntnis 7 (1):123-125.
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  • Conceptual contingency and abstract existence.Mark Colyvan - 2000 - Philosophical Quarterly 50 (198):87-91.
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