A Mathematical Prelude to the Philosophy of Mathematics
Springer International Publishing (Verlag)
978-3-319-34833-9 (ISBN)
This book is based on two premises: one cannot understand philosophy of mathematics without understanding mathematics and one cannot understand mathematics without doing mathematics. It draws readers into philosophy of mathematics by having them do mathematics. It offers 298 exercises, covering philosophically important material, presented in a philosophically informed way. The exercises give readers opportunities to recreate some mathematics that will illuminate important readings in philosophy of mathematics. Topics include primitive recursive arithmetic, Peano arithmetic, Gödel's theorems, interpretability, the hierarchy of sets, Frege arithmetic and intuitionist sentential logic. The book is intended for readers who understand basic properties of the natural and real numbers and have some background in formal logic.
Stephen Pollard has been on the faculty of Truman State University since 1985. He received his B.A. from Haverford College in 1979 and his Ph.D. from the University of Texas in 1983. His research and publications deal primarily with logic and the philosophy of mathematics, but his interests also include classical Greek philosophy, American pragmatism and the philosophy of science. Pollard is the author of Philosophical Introduction to Set Theory (Notre Dame, 1990), co-translator of The Continuum by Herman Weyl (Dover, 1994), co-author of Closure Spaces and Logic (Kluwer, 1996) and translator/editor of Essays on the Foundations of Mathematics by Moritz Pasch (Springer, 2010). His papers have appeared in Analysis, Erkenntnis, Logique et Analyse, The Monist, Notre Dame Journal of Formal Logic, Noûs, Philosophical Studies, Philosophia Mathematica, Synthese and other journals.
Preface.- Chapter 1: Recursion, Induction.- Chapter 2: Peano Arithmetic, Incompleteness.- Chapter 3: Hereditarily Finite Lists.- Chapter 4: Zermelian Lists.- Chapter 5: The Hierarchy of Sets. Chapter 6: Frege Arithmetic.- Chapter 7: Intuitionist Logic.- Chapter 8. Solutions of Odd-Numbered Exercises.- Index.
"A Mathematical Prelude to the Philosophy of Mathematics is an easy-to-read book with a variety of helpful exercises covering a range of topics in the foundations of mathematics, with chapters focussing on set theory, arithmetic, and intuitionistic logic. ... students interested in contemporary issues in the philosophy of mathematics would likely still find these useful, as many of the issues raised by these results remain live in the literature to this day." (Audrey Yap, Philosophia Mathematica, Vol. 24 (2), June, 2016)
"This book provides some mathematical background for undergraduate students of philosophy who want to study philosophy of mathematics. It provides mathematical training using a lot of elementary exercises." (Reinhard Kahle, Mathematical Reviews, January, 2016)
"There have been many books on the philosophy of mathematics, but I do not think that many books aim to prepare students properly for the subject, which is what Pollard wants to do. ... For readers like me, who know some basic number theory and analysis, as well as basic logic and computability theory, Pollard's book will be a stimulating and novel experience." (John Stillwell, Studia Logica, Vol. 104, 2016)
"The aim of the book is to give students opportunities to recreate some mathematics that will illuminate important readings in the philosophy of mathematics. ... The book contains 298 exercises in the mentioned areas supported by explanatory materials. Each chapter ends by solutions of odd-numbered exercises as well as references. ... The book can serve as a supplement to primary texts chosen by instructors." (Roman Murawski, zbMATH, Vol. 1294, 2014)Erscheinungsdatum | 16.09.2016 |
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Zusatzinfo | XI, 202 p. |
Verlagsort | Cham |
Sprache | englisch |
Maße | 155 x 235 mm |
Themenwelt | Geisteswissenschaften ► Philosophie ► Allgemeines / Lexika |
Mathematik / Informatik ► Mathematik ► Allgemeines / Lexika | |
Mathematik / Informatik ► Mathematik ► Logik / Mengenlehre | |
Naturwissenschaften | |
Schlagworte | Frege Arithmetic • Gödel Glivenko Theorem • Gödel Incompleteness • Hereditarily Finite Lists • Hierarchy of Sets • Intuitionist Connectives • Intuitionist Logic • Iterative Set Theory • Mathematical Foundations • Mathematical Logic • Mathematical Logic and Foundations • Monadic Second Order Logic • peano arithmetic • Peregrin Logic of Inference • philosophy of science • Primitive Recursive Arithmetic • Religion and Philosophy • Representability of Recursive Functions • Set Theory Axioms • Zermelian Lists |
ISBN-10 | 3-319-34833-7 / 3319348337 |
ISBN-13 | 978-3-319-34833-9 / 9783319348339 |
Zustand | Neuware |
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