This volume contains thirteen papers that were presented at the 2017 Annual Meeting of the Canadian Society for History and Philosophy of Mathematics/Société canadienne d’histoire et de philosophie des mathématiques, which was held at Ryerson University in Toronto. It showcases rigorously reviewed modern scholarship on an interesting variety of topics in the history and philosophy of mathematics from Ancient Greece to the twentieth century.
A series of chapters all set in the eighteenth century consider topics such as John Marsh’s techniques for the computation of decimal fractions, Euler’s efforts to compute the surface area of scalene cones, a little-known work by John Playfair on the practical aspects of mathematics, and Monge’s use of descriptive geometry.
The remaining chapters deal with the philosophy of twentieth-century mathematics through topics such as an historically informed discussion of finitism and its limits; a reexamination of Mary Leng’s defenses of mathematical fictionalism through an alternative, anti-realist approach to mathematics; and a look at the reasons that mathematicians select specific problems to pursue.
Written by leading scholars in the field, these papers are accessible to not only mathematicians and students of the history and philosophy of mathematics, but also anyone with a general interest in mathematics.
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Thomas, The Definitions and Theorems of the Spherics of Theodosios.- Melville, John Marsh and the Curious World of Decimal Arithmetic.- Hackborn, Euler’s Discovery and Resolution of d’Alembert’s Paradox.- Curtin, Euler’s Work on the Surface Area of Scalene Cones.- Alexander, What Mathematics Rittenhouse Knew.- Ackerberg-Hastings, John Playfair’s Approach to ‘the Practical Parts of the Mathematics.’- Baltus, Monge’s Descriptive Geometry in Three Examples.- Fraser, The Culture of Research Mathematics in 1860s Prussia: Adolph Mayer and the Theory of the Second Variation in the Calculus of Variations.- Therrien, The Axiom of Choice as a Paradigm Shift: The Case for the Distinction between the Ontological and the Methodological Crisis in the Foundations of Mathematics.- Godard, Boltzmann et Vlasov.- Darnell, Thomas-Bolduc, Takeuti’s Well-Ordering Proof: Finitistically Fine?- Beriault, A Non-Error Theory Approach to Mathematical Fictionalism.- Ashton, Mathematical Problem Choice and the Contact of Minds.
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