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Flavia Padovani (2011). Relativizing the Relativized a Priori: Reichenbach’s Axioms of Coordination Divided.

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  1.  41
    Measurement, Coordination, and the Relativized a Priori.Flavia Padovani - forthcoming - Studies in History and Philosophy of Modern Physics.
  2.  29
    Reichenbach’s Transcendental Probability.Fedde Benedictus & Dennis Dieks - 2015 - Erkenntnis 80 (1):15-38.
    The aim of this article is twofold. First, we shall review and analyse the neo-kantian justification for the application of probabilistic concepts in science that was defended by Hans Reichenbach early in his career, notably in his dissertation of 1916. At first sight this kantian approach seems to contrast sharply with Reichenbach’s later logical positivist, frequentist viewpoint. But, and this is our second goal, we shall attempt to show that there is an underlying continuity in Reichenbach’s thought: typical features of (...)
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  3.  41
    The Propensity Interpretation of Probability: A Re-Evaluation.Joseph Berkovitz - 2015 - Erkenntnis 80 (S3):629-711.
    Single-case and long-run propensity theories are among the main objective interpretations of probability. There have been various objections to these theories, e.g. that it is difficult to explain why propensities should satisfy the probability axioms and, worse, that propensities are at odds with these axioms, that the explication of propensities is circular and accordingly not informative, and that single-case propensities are metaphysical and accordingly non-scientific. We consider various propensity theories of probability and their prospects in light of these objections. We (...)
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  4.  5
    Measurement, Coordination, and the Relativized a Priori.Flavia Padovani - 2015 - Studies in History and Philosophy of Science Part B: Studies in History and Philosophy of Modern Physics 52 (Part B):123-128.
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  5.  17
    Reichenbach on Causality in 1923: Scientific Inference, Coordination, and Confirmation.Flavia Padovani - 2015 - Studies in History and Philosophy of Science Part A 53:3-11.
  6.  15
    A Revolution Without Tooth and Claw—Redefining the Physical Base Units.Wolfgang Pietsch - 2014 - Studies in History and Philosophy of Science Part A 46:85-93.
    A case study is presented of a recent proposal by the major metrology institutes to redefine four of the physical base units, namely kilogram, ampere, mole, and kelvin. The episode shows a number of features that are unusual for progress in an objective science: for example, the progress is not triggered by experimental discoveries or theoretical innovations; also, the new definitions are eventually implemented by means of a voting process. In the philosophical analysis, I will first argue that the episode (...)
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  7. Ernst Cassirer's Neo-Kantian Philosophy of Geometry.Jeremy Heis - 2011 - British Journal for the History of Philosophy 19 (4):759 - 794.
    One of the most important philosophical topics in the early twentieth century and a topic that was seminal in the emergence of analytic philosophy was the relationship between Kantian philosophy and modern geometry. This paper discusses how this question was tackled by the Neo-Kantian trained philosopher Ernst Cassirer. Surprisingly, Cassirer does not affirm the theses that contemporary philosophers often associate with Kantian philosophy of mathematics. He does not defend the necessary truth of Euclidean geometry but instead develops a kind of (...)
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