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Analysis in greek geometry

Mind 45 (180):464-473 (1936)

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  1. Five theories of reasoning: Interconnections and applications to mathematics.Alison Pease & Andrew Aberdein - 2011 - Logic and Logical Philosophy 20 (1-2):7-57.
    The last century has seen many disciplines place a greater priority on understanding how people reason in a particular domain, and several illuminating theories of informal logic and argumentation have been developed. Perhaps owing to their diverse backgrounds, there are several connections and overlapping ideas between the theories, which appear to have been overlooked. We focus on Peirce’s development of abductive reasoning [39], Toulmin’s argumentation layout [52], Lakatos’s theory of reasoning in mathematics [23], Pollock’s notions of counterexample [44], and argumentation (...)
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  • Aristotle and Greek Geometrical Analysis.Enrico Berti - 2021 - Philosophia Scientiae 25:9-21.
    This paper aims to show that an examination of some passages in Aristotle’s work can contribute to the resolution of crucial problems related to the interpretation of ancient geometrical analysis. In this context, we will focus in particular on the famous passage of the Posterior Analytics in which Aristotle cryptically refers to the analysis practised by the geometers and we will show the fundamental importance of this passage for a correct understanding of ancient geometrical analysis.
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  • Three Notes on the Method of Analysis and Synthesis in its Ancient and (Arabic) Medieval Contexts.Hany Moubarez - 2020 - Studia Humana 9 (1):5-11.
    Most historians and philosophers of philosophy and history of mathematics hold one interpretation or the other of the nature of method of analysis and synthesis in itself and in its historical development. In this paper, I am trying to prove – through three points – that, in fact, there were two understandings of that method in Greek mathematics and philosophy, and which were reflected in Arabic mathematical science and philosophy; this reflection is considered as proof also of this double nature (...)
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  • Rethinking Logic: Logic in Relation to Mathematics, Evolution, and Method.Carlo Cellucci - 2013 - Dordrecht, Netherland: Springer.
    This volume examines the limitations of mathematical logic and proposes a new approach to logic intended to overcome them. To this end, the book compares mathematical logic with earlier views of logic, both in the ancient and in the modern age, including those of Plato, Aristotle, Bacon, Descartes, Leibniz, and Kant. From the comparison it is apparent that a basic limitation of mathematical logic is that it narrows down the scope of logic confining it to the study of deduction, without (...)
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  • The Readings of Apollonius' On the Cutting off of a Ratio.Ioannis M. Vandoulakis - 2012 - Arabic Sciences and Philosophy 22 (1):137-149.
    ExtractDuring the second half of the twentieth century an attention of historians of mathematics shifted to mathematics of the Late Antiquity and its subsequent development by mathematicians of the Arabic world. Many critical editions of works of mathematicians of the Hellenistic era have made their appearance, giving rise to a new, more detailed historical picture. Among these are the critical editions of the works of Diophantus, Apollonius, Archimedes, Pappus, Diocles, and others.Send article to KindleTo send this article to your Kindle, (...)
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  • Platon et la Géométrie : la méthode dialectique en République 509d–511e.Yvon Lafrance - 1980 - Dialogue 19 (1):46-93.
    Dans un célèbre ouvrage surContemplation et Vie contemplative selon Platon, A.J. Festugière donnait de la dialectique platonicienne une interprétation selon laquelle celle-ci constituait une véritable expérience mystique possédant presque tous les traits de la contemplation chrétienne. La dialectique platonicienne y était présentée, surtout dans son acte final, comme une sorte d'extase, une union d'ordre mystique, un contact de l'âme perdue dans son objet, contact qui suscite en elle un sentiment qui dépasse tout l'ordre normal de la connaissance. Le Bien ou (...)
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  • The scope of logic: deduction, abduction, analogy.Carlo Cellucci - 1998 - Theoria 64 (2-3):217-242.
    The present form of mathematical logic originated in the twenties and early thirties from the partial merging of two different traditions, the algebra of logic and the logicist tradition (see [27], [41]). This resulted in a new form of logic in which several features of the two earlier traditions coexist. Clearly neither the algebra of logic nor the logicist’s logic is identical to the present form of mathematical logic, yet some of their basic ideas can be distinctly recognized within it. (...)
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  • Method of Analysis: A Paradigm of Mathematical Reasoning?Jaakko Hintikka - 2012 - History and Philosophy of Logic 33 (1):49 - 67.
    The ancient Greek method of analysis has a rational reconstruction in the form of the tableau method of logical proof. This reconstruction shows that the format of analysis was largely determined by the requirement that proofs could be formulated by reference to geometrical figures. In problematic analysis, it has to be assumed not only that the theorem to be proved is true, but also that it is known. This means using epistemic logic, where instantiations of variables are typically allowed only (...)
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  • Aristotle, Menaechmus, and Circular Proof.Jonathan Barnes - 1976 - Classical Quarterly 26 (02):278-.
    The Regress: Knowledge, we like to suppose, is essentially a rational thing: if I claim to know something, I must be prepared to back up my claim by statingmy reasons for making it;and if my claim is to be upheld, my reasons must begood reasons. Now suppose I know that Q; and let my reasons be conjunctively contained in the proposition that R. Clearly, I must believe that R ;equally clearly, I must know that R . Thus if I know (...)
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  • The Relationship between Hypotheses and Images in the Mathematical Subsection of the Divided Line of Plato's Republic.Moon-Heum Yang - 2005 - Dialogue 44 (2):285-312.
    RésuméEn expliquant la relation entre hypothèses et images dans l'analogie de la ligne du livre Vl de laRépubliquede Platon, je m'attarde d'abordsur l'élucidation platonicienne de la nature des mathématiques telle que la conçoit le mathématicien lui-même. Je poursuis avec une critique des interprétations traditionnelles de cette relation, qui partent de l'assomption douteuse que les mathématiques s'occupent des Formes platoniciennes. Pour formuler mon point de vue sur cette relation, j'exploite la notion de «structure». Je montre comment les «hypothèses» comme principes de (...)
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  • Analyzing (and synthesizing) analysis.Jaakko Hintikka - unknown
    Equally surprisingly, Descartes’s paranoid belief was shared by several contemporary mathematicians, among them Isaac Barrow, John Wallis and Edmund Halley. (Huxley 1959, pp. 354-355.) In the light of our fuller knowledge of history it is easy to smile at Descartes. It has even been argued by Netz that analysis was in fact for ancient Greek geometers a method of presenting their results (see Netz 2000). But in a deeper sense Descartes perceived something interesting in the historical record. We are looking (...)
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  • Sherlock holmes ‐ Philosopher detective.Wulf Rehder - 1979 - Inquiry: An Interdisciplinary Journal of Philosophy 22 (1-4):441-457.
    Although prima facie no more than a successful private detective, Sherlock Holmes is a classic exponent of scientific method and has laid down several fundamental rules of scientific discovery and truth?detection. While he rediscovered and modified well?known principles of induction, analysis and synthesis, and decision theory, he also made significant contributions to patterns of explanation, and with his ?principle of exclusion? was an ingenious innovator. This latter cornerstone of Holmes's methodology led him to an interesting modal theory of the ?improbable (...)
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  • Practical reason and mathematical argument.John O'Neill - 1998 - Studies in History and Philosophy of Science Part A 29 (2):195-205.
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  • Greek Geometrical Analysis.Ali Behboud - 1994 - Centaurus 37 (1):52-86.
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  • Rigorous Purposes of Analysis in Greek Geometry.Viktor Blåsjö - 2021 - Philosophia Scientiae 25:55-80.
    Analyses in Greek geometry are traditionally seen as heuristic devices. However, many occurrences of analysis in formal treatises are difficult to justify in such terms. I show that Greek analysies of geometrics can also serve formal mathematical purposes, which are arguably incomplete without which their associated syntheses are arguably incomplete. Firstly, when the solution of a problem is preceded by an analysis, the analysis latter proves rigorously that there are no other solutions to the problem than those offered in the (...)
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