04437nam 2200685 450 991046524640332120211005170157.09781400833955electronic book1-282-53145-X1-4008-3395-70-691-12738-710.1515/9781400833955(CKB)2560000000324435(SSID)ssj0000361285(PQKBManifestationID)11305314(PQKBTitleCode)TC0000361285(PQKBWorkID)10353109(PQKB)10024595(MiAaPQ)EBC485784(DE-B1597)446394(OCoLC)979779657(DE-B1597)9781400833955(Au-PeEL)EBL485784(CaPaEBR)ebr10376732(CaONFJC)MIL253145(OCoLC)609856422(EXLCZ)99256000000032443520061004h20072007 uy 0engurcn|||||||||txtrdacontentcrdamediacrrdacarrierHow mathematicians think using ambiguity, contradiction, and paradox to create mathematics /William ByersCourse BookPrinceton, NJ :Princeton University Press,2007.©20071 online resource (vii, 415 pages) illustrationBibliographic Level Mode of Issuance: Monograph0-691-15091-5 Print version: 9780691145990 0-691-14599-7 Includes bibliographical references (pages 399-405) and index.Frontmatter --Contents --Acknowledgments --INTRODUCTION. Turning on the Light --Section I. The Light of Ambiguity --Introduction --Chapter 1. Ambiguity in Mathematics --Chapter 2. The Contradictory in Mathematics --Chapter 3. Paradoxes and Mathematics: Infinity and the Real Numbers --Chapter 4. More Paradoxes of Infinity: Geometry, Cardinality, and Beyond --Section II. The Light as Idea --Introduction --Chapter 5. The Idea as an Organizing Principle --Chapter 6. Ideas, Logic, and Paradox --Chapter 7. Great Ideas --Section III. The Light and the Eye of the Beholder --Introduction --Chapter 8. The Truth of Mathematics --Chapter 9. Conclusion: Is Mathematics Algorithmic or Creative? --Notes --Bibliography --IndexTo many outsiders, mathematicians appear to think like computers, grimly grinding away with a strict formal logic and moving methodically--even algorithmically--from one black-and-white deduction to another. Yet mathematicians often describe their most important breakthroughs as creative, intuitive responses to ambiguity, contradiction, and paradox. A unique examination of this less-familiar aspect of mathematics, How Mathematicians Think reveals that mathematics is a profoundly creative activity and not just a body of formalized rules and results. Nonlogical qualities, William Byers shows, play an essential role in mathematics. Ambiguities, contradictions, and paradoxes can arise when ideas developed in different contexts come into contact. Uncertainties and conflicts do not impede but rather spur the development of mathematics. Creativity often means bringing apparently incompatible perspectives together as complementary aspects of a new, more subtle theory. The secret of mathematics is not to be found only in its logical structure. The creative dimensions of mathematical work have great implications for our notions of mathematical and scientific truth, and How Mathematicians Think provides a novel approach to many fundamental questions. Is mathematics objectively true? Is it discovered or invented? And is there such a thing as a "final" scientific theory? Ultimately, How Mathematicians Think shows that the nature of mathematical thinking can teach us a great deal about the human condition itself.MathematiciansPsychologyMathematicsPsychological aspectsMathematicsPhilosophyElectronic books.MathematiciansPsychology.MathematicsPsychological aspects.MathematicsPhilosophy.510Byers William1943-944438MiAaPQMiAaPQMiAaPQBOOK9910465246403321How mathematicians think2475405UNINA