Philosophy of Mathematics: Set Theory, Measuring Theories, and Nominalism

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Frankfort, Germany: Ontos (2008)
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Abstract

The ten contributions in this volume range widely over topics in the philosophy of mathematics. The four papers in Part I (entitled "Set Theory, Inconsistency, and Measuring Theories") take up topics ranging from proposed resolutions to the paradoxes of naïve set theory, paraconsistent logics as applied to the early infinitesimal calculus, the notion of "purity of method" in the proof of mathematical results, and a reconstruction of Peano's axiom that no two distinct numbers have the same successor. Papers in the second part ("The Challenge of Nominalism") concern the nominalistic thesis that there are no abstract objects. The two contributions in Part III ("Historical Background") consider the contributions of Mill, Frege, and Descartes to the philosophy of mathematics.

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9783110323092   3110323095   3868380094   9783110323689

DOI

10.1515/9783110323689
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Chapters

Logical and Semantic Puritiy.Andrew Arana
The Compulsion to Believe: Logical Inference and Normativity.Jody Azzouni
Nominalism and Mathematical Intuition.Otávio Bueno
Who’s Afraid of Inconsistent Mathematics?Mark Colyvan
Descartes on Mathematical Essences.Raffaella De Rosa & Otávio Bueno
On Using Measuring Numbers according to Measuring Theories.Wilhelm K. Essler
Mill, Frege and the Unity of Mathematics.Madeline Muntersbjorn
Representationalism and Set-Theoretic Paradox.Douglas Patterson
Jobless Objects: Mathematical Posits in Crisis.Yvonne Raley
Is Indispensability Still a Problem for Fictionalism?Susan Vineberg

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Gerhard Preyer
Goethe University Frankfurt

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Огляд сучасної філософії науки.Олександр Габович & Володимир Кузнєцов - 2022 - Filosofska Dumka 2022 (1):115-133.

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