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185Did the greeks discover the irrationals?Philosophy 74 (2): 169-176. 1999.A popular view is that the great discovery of Pythagoras was that there are irrational numbers, e.g., the positive square root of two. Against this it is argued that mathematics and geometry, together with their applications, do not show that there are irrational numbers or compel assent to that proposition.
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Chapter 7: Arithmetic and RulesPoznan Studies in the Philosophy of the Sciences and the Humanities 90 183-211. 2006.
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243A problem about conversational implicatureLinguistics and Philosophy 3 (1). 1979.Conversational implicatures are easy to grasp for the most part. But it is another matter to give a rational reconstruction of how they are grasped. We argue that Grice's attempt to do this fails. We distinguish two sorts of cases: (1) those in which we grasp the implicature by asking ourselves what would the speaker have to believe given that what he said is such as is required by the talk exchange; (2) those in which we grasp the implicature by asking ourselves why it is that what the speaker …Read more
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Chapter 10: Thesis ThreePoznan Studies in the Philosophy of the Sciences and the Humanities 90 254-283. 2006.
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Chapter 1: IntroductionPoznan Studies in the Philosophy of the Sciences and the Humanities 90 35-42. 2006.
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893Are All Tautologies True?Logique Et Analyse 125 (25): 3-14. 1989.The paper asks: are all tautologies true in a language with truth-value gaps? It answers that they are not. No tautology is false, of course, but not all are true. It also contends that not all contradictions are false in a language with truth-value gaps, though none are true.
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Chapter 3: Objectivism and Realism in Frege's Philosophy of ArithmeticPoznan Studies in the Philosophy of the Sciences and the Humanities 90 73-101. 2006.
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834Bound Variables and Schematic LettersLogique Et Analyse 95 (95): 425-429. 1981.The paper purports to show, against Quine, that one can construct a language , which results from the extension of the theory of truth functions by introducing sentence letter quantification. Next a semantics is provided for this language. It is argued that the quantification is neither substitutional nor requires one to consider the sentence letters as taking entities as values.
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Chapter 4: The Peano AxiomsPoznan Studies in the Philosophy of the Sciences and the Humanities 90 105-128. 2006.
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Chapter 2: Notes to GrundlagenPoznan Studies in the Philosophy of the Sciences and the Humanities 90 45-72. 2006.
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64In this book a non-realist philosophy of mathematics is presented. Two ideas are essential to its conception. These ideas are (i) that pure mathematics--taken in isolation from the use of mathematical signs in empirical judgement--is an activity for which a formalist account is roughly correct, and (ii) that mathematical signs nonetheless have a sense, but only in and through belonging to a system of signs with empirical application. This conception is argued by the two authors and is critically…Read more
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Analytical Table of ContentsPoznan Studies in the Philosophy of the Sciences and the Humanities 90 31-33. 2006.
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Chapter 5: Existence, Number, and RealismPoznan Studies in the Philosophy of the Sciences and the Humanities 90 129-155. 2006.
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119A fregean principleHistory and Philosophy of Logic 19 (3): 125-135. 1998.Frege held that the result of applying a predicate to names lacks reference if any of the names lack reference. We defend the principle against a number of plausible objections. We put forth an account of consequence for a first-order language with identity in which the principle holds
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Chapter 8: Thesis OnePoznan Studies in the Philosophy of the Sciences and the Humanities 90 215-240. 2006.
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Chapter 6: Arithmetic and NecessityPoznan Studies in the Philosophy of the Sciences and the Humanities 90 159-182. 2006.
Areas of Specialization
| Metaphysics and Epistemology |
| Science, Logic, and Mathematics |
Areas of Interest
| Metaphysics and Epistemology |
| Science, Logic, and Mathematics |