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＜電子ブック＞
Visualization, Explanation and Reasoning Styles in Mathematics / edited by P. Mancosu, Klaus Frovin Jørgensen, S.A. Pedersen
(Synthese Library, Studies in Epistemology, Logic, Methodology, and Philosophy of Science. ISSN:25428292 ; 327)

版	1st ed. 2005.
出版者	(Dordrecht : Springer Netherlands : Imprint: Springer)
出版年	2005
本文言語	英語
大きさ	X, 300 p : online resource
著者標目	Mancosu, P editor Jørgensen, Klaus Frovin editor Pedersen, S.A editor SpringerLink (Online service)
件　名	LCSH:Mathematics LCSH:Information visualization LCSH:History LCSH:Mathematical logic LCSH:Science -- Philosophy  全ての件名で検索 FREE:Mathematics FREE:Data and Information Visualization FREE:History of Mathematical Sciences FREE:Mathematical Logic and Foundations FREE:Philosophy of Science
一般注記	Mathematical Reasoning and Visualization -- Visualization in Logic and Mathematics -- From Symmetry Perception to Basic Geometry -- Naturalism, Pictures, and Platonic Intuitions -- Mathematical Activity -- Mathematical Explanation and Proof Styles -- Tertium Non Datur: On Reasoning Styles in Early Mathematics -- The Interplay Between Proof and Algorithm in 3rd Century China: The Operation as Prescription of Computation and the Operation as Argumento -- Proof Style and Understanding in Mathematics I: Visualization, Unification and Axiom Choice -- The Varieties of Mathematical Explanation -- The Aesthetics of Mathematics: A Study This book contains groundbreaking contributions to the philosophical analysis of mathematical practice. Several philosophers of mathematics have recently called for an approach to philosophy of mathematics that pays more attention to mathematical practice. Questions concerning concept-formation, understanding, heuristics, changes in style of reasoning, the role of analogies and diagrams etc. have become the subject of intense interest. The historians and philosophers in this book agree that there is more to understanding mathematics than a study of its logical structure. How are mathematical objects and concepts generated? How does the process tie up with justification? What role do visual images and diagrams play in mathematical activity? What are the different epistemic virtues (explanatoriness, understanding, visualizability, etc.) which are pursued and cherished by mathematicians in their work? The reader will find here systematic philosophical analyses as well as a wealth of philosophically informed case studies ranging from Babylonian, Greek, and Chinese mathematics to nineteenth century real and complex analysis HTTP:URL=https://doi.org/10.1007/1-4020-3335-4

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