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17Review of J. Folina, Poincare and the Philosophy of Mathematics (review)Philosophia Mathematica 3 (2): 208-218. 1995.
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31Essay ReviewHistory and Philosophy of Logic 9 (1): 93-105. 1988.S. SHAPIRO (ed.), Intensional Mathematics (Studies in Logic and the Foundations of Mathematics, vol. 11 3). Amsterdam: North-Holland, 1985. v + 230 pp. $38.50/100Df
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105Proof: Its nature and significanceIn Bonnie Gold & Roger A. Simons (eds.), Proof and Other Dilemmas: Mathematics and Philosophy, Mathematical Association of America. pp. 1. 2008.I focus on three preoccupations of recent writings on proof. I. The role and possible effects of empirical reasoning in mathematics. Do recent developments (specifically, the computer-assisted proof of the 4CT) point to something essentially new as regards the need for and/or effects of using broadly empirical and inductive reasoning in mathematics? In particular, should we see such things as the computer-assisted proof of the 4CT as pointing to the existence of mathematical truths of which we c…Read more
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54Mind in the shadowsStudies in History and Philosophy of Science Part B: Studies in History and Philosophy of Modern Physics 29 (1): 123-136. 1998.This is a review of Penrose's trilogy, The Emperor's New Mind, Shadows of the Mind and The Large the Small and the Human Mind.
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D. MIÉVILLE . "Kurt Gödel: Actes du Colloque, Neuch'tel 13-14 juin 1991" (review)History and Philosophy of Logic 15 (1): 135. 1994.
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2Aleksandar Pavković, ed., Contemporary Yugoslav Philosophy: The Analytic Approach Reviewed byPhilosophy in Review 9 (12): 492-496. 1989.
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188What does Gödel's second theorem say?Philosophia Mathematica 9 (1): 37-71. 2001.We consider a seemingly popular justification (we call it the Re-flexivity Defense) for the third derivability condition of the Hilbert-Bernays-Löb generalization of Godel's Second Incompleteness Theorem (G2). We argue that (i) in certain settings (rouglily, those where the representing theory of an arithmetization is allowed to be a proper subtheory of the represented theory), use of the Reflexivity Defense to justify the tliird condition induces a fourth condition, and that (ii) the justificat…Read more
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44Poincaré versus Russell sur le rôle de la logique dans les mathématiquesLes Etudes Philosophiques 97 (2): 153. 2011.Au début du XXe siècle, Poincaré et Russell eurent un débat à propos de la nature du raisonnement mathématique. Poincaré, comme Kant, défendait l’idée que le raisonnement mathématique était de caractère non logique. Russell soutenait une conception contraire et critiquait Poincaré. Je défends ici l’idée que les critiques de Russell n’étaient pas fondées.In the early twentieth century, Poincare and Russell engaged in a discussion concerning the nature of mathematical reasoning. Poincare, like Kan…Read more
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69Proof and Knowledge in Mathematics (edited book)Routledge. 1992.These questions arise from any attempt to discover an epistemology for mathematics. This collection of essays considers various questions concerning the nature of justification in mathematics and possible sources of that justification. Among these are the question of whether mathematical justification is _a priori_ or _a posteriori_ in character, whether logical and mathematical differ, and if formalization plays a significant role in mathematical justification
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9Introduction to the Fiftieth Anniversary IssuesNotre Dame Journal of Formal Logic 50 (4): 363-364. 2009.
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5Janet Folina, Poincaré and the Philosophy of Mathematics (review)Philosophia Mathematica 3 (2): 208-218. 1995.
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22Introduction to Logicism and the Paradoxes: A ReappraisalNotre Dame Journal of Formal Logic 41 (3): 185-185. 2000.
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22Duality, Epistemic Efficiency and ConsistencyIn G. Link (ed.), Formalism & Beyond, . pp. 1-24. 2014.Duality has often been described as a means of extending our knowledge with a minimal additional outlay of investigative resources. I consider possible arguments for this view. Major elements of this argument are out of keeping with certain widely held views concerning the nature of axiomatic theories (both in projective geometry and elsewhere). They also require a special form of consistency requirement.
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209The four-color theorem and mathematical proofJournal of Philosophy 77 (12): 803-820. 1980.I criticize a recent paper by Thomas Tymoczko in which he attributes fundamental philosophical significance and novelty to the lately-published computer-assisted proof of the four color theorem (4CT). Using reasoning precisely analogous to that employed by Tymoczko, I argue that much of traditional mathematical proof must be seen as resting on what Tymoczko must take as being "empirical" evidence. The new proof of the 4CT, with its use of what Tymoczko calls "empirical" evidence is therefore not…Read more
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30Proof, Logic and Formalization (edited book)Routledge. 1992.The mathematical proof is the most important form of justification in mathematics. It is not, however, the only kind of justification for mathematical propositions. The existence of other forms, some of very significant strength, places a question mark over the prominence given to proof within mathematics. This collection of essays, by leading figures working within the philosophy of mathematics, is a response to the challenge of understanding the nature and role of the proof.
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193On an alleged refutation of Hilbert's program using gödel's first incompleteness theoremJournal of Philosophical Logic 19 (4). 1990.It is argued that an instrumentalist notion of proof such as that represented in Hilbert's viewpoint is not obligated to satisfy the conservation condition that is generally regarded as a constraint on Hilbert's Program. A more reasonable soundness condition is then considered and shown not to be counter-exemplified by Godel's First Theorem. Finally, attention is given to the question of what a theory is; whether it should be seen as a "list" or corpus of beliefs, or as a method for selecting be…Read more
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79FormalismIn Stewart Shapiro (ed.), Oxford Handbook of Philosophy of Mathematics and Logic, Oxford University Press. pp. 236--317. 2005.A comprehensive historical overview of formalist ideas in the philosophy of mathematics.
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466Brouwerian intuitionismMind 99 (396): 501-534. 1990.The aims of this paper are twofold: firstly, to say something about that philosophy of mathematics known as 'intuitionism' and, secondly, to fit these remarks into a more general message for the philosophy of mathematics as a whole. What I have to say on the first score can, without too much inaccuracy, be compressed into two theses. The first is that the intuitionistic critique of classical mathematics can be seen as based primarily on epistemological rather than on meaning-theoretic considerat…Read more
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89Wright on the non-mechanizability of intuitionist reasoningPhilosophia Mathematica 3 (1): 103-119. 1995.Crispin Wright joins the ranks of those who have sought to refute mechanist theories of mind by invoking Gödel's Incompleteness Theorems. His predecessors include Gödel himself, J. R. Lucas and, most recently, Roger Penrose. The aim of this essay is to show that, like his predecessors, Wright, too, fails to make his case, and that, indeed, he fails to do so even when judged by standards of success which he himself lays down.
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2Proof and Knowledge in MathematicsRevue Philosophique de la France Et de l'Etranger 185 (1): 133-134. 1992.
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3Introduction to the Fiftieth Anniversary IssuesNotre Dame Journal of Formal Logic 51 (1): 1-2. 2010.
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67Constructive existence claimsIn Matthias Schirn (ed.), The Philosophy of Mathematics Today: Papers From a Conference Held in Munich From June 28 to July 4,1993, Clarendon Press. pp. 1998--307. 1998.It is a commonplace of constructivist thought that a claim that an object of a certain kind exists is to be backed by an explicit display or exhibition of an object that is manifestly of that kind. Let us refer to this requirement as the exhibition condition. The main objective of this essay is to examine this requirement and to arrive at a better understanding of its epistemic character and the role that it plays in the two main constructivist philosophies of this century---the intuitionist pro…Read more
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14Introduction to Special Issue on George S. BoolosNotre Dame Journal of Formal Logic 40 (1): 1-2. 1999.
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103An Essay on Mathematical Instrumentalism M. Detlefsen. THE PHILOSOPHICAL FUNDAMENTALS OF HILBERT'S PROGRAM 1. INTRODUCTION In this chapter I shall attempt to set out Hilbert's Program in a way that is more revealing than ...
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1The Importance of Gödel's Second Incompleteness Theorem for the Foundations of MathematicsDissertation, The Johns Hopkins University. 1976.
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3Purity as an ideal of proofIn Paolo Mancosu (ed.), The Philosophy of Mathematical Practice, Oxford University Press. pp. 179-197. 2008.Various ideals of purity are surveyed and discussed. These include the classical Aristotelian ideal, as well as certain neo-classical and contemporary ideals. The focus is on a type of purity ideal I call topical purity. This is purity which emphasizes a certain symmetry between the conceptual resources used to prove a theorem and those needed for the clarification of its content. The basic idea is that the resources of proof ought ideally to be restricted to those which determine its content.
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58On a theorem of FefermanPhilosophical Studies 38 (2). 1980.In this paper I argue that Feferman's theorem does not signify the existence of skeptic-satisfying consistency proofs. However, my argument for this is much different than other arguments (most particularly Resnik's) for the same claim. The argument that I give arises form an analysis of the notion of 'expression', according to which the specific character of that notion is seen as varying from one context of application (of a result of arithmetic metamathematics) to another.
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83Fregean hierarchies and mathematical explanationInternational Studies in the Philosophy of Science 3 (1). 1988.There is a long line of thinkers in the philosophy of mathematics who have sought to base an account of proof on what might be called a 'metaphysical ordering' of the truths of mathematics. Use the term 'metaphysical' to describe these orderings is intended to call attention to the fact that they are regarded as objective and not subjective and that they are conceived primarily as orderings of truths and only secondarily as orderings of beliefs. -/- I describe and consider two models for such or…Read more
Michael Detlefsen
(1948 - 2019)
Notre Dame, Indiana, United States of America
Areas of Specialization
Logic and Philosophy of Logic |
Philosophy of Mathematics |