04665nam a22004695i 4500 978-3-7643-8350-3 DE-He213 20210619205710.0 cr nn 008mamaa 100301s2007 sz | s |||| 0|eng d 9783764383503 978-3-7643-8350-3 10.1007/978-3-7643-8350-3 doi QA21-27 PBX bicssc MAT015000 bisacsh PBX thema 510.9 23 Ferreirós, José. author. aut http://id.loc.gov/vocabulary/relators/aut Labyrinth of Thought [electronic resource] : A History of Set Theory and Its Role in Modern Mathematics / by José Ferreirós. 2nd ed. 2007. Basel : Birkhäuser Basel : Imprint: Birkhäuser, 2007. XXVI, 466 p. 7 illus. online resource. text txt rdacontent computer c rdamedia online resource cr rdacarrier text file PDF rda The Emergence of Sets within Mathematics -- Institutional and Intellectual Contexts in German Mathematics, 1800–1870 -- A New Fundamental Notion: Riemann’s Manifolds -- Dedekind and the Set-theoretical Approach to Algebra -- The Real Number System -- Origins of the Theory of Point-Sets -- Entering the Labyrinth-Toward Abstract Set Theory -- The Notion of Cardinality and the Continuum Hypothesis -- Sets and Maps as a Foundation for Mathematics -- The Transfinite Ordinals and Cantor’s Mature Theory -- In Search of an Axiom System -- Diffusion, Crisis, and Bifurcation: 1890 to 1914 -- Logic and Type Theory in the Interwar Period -- Consolidation of Axiomatic Set Theory. Labyrinth of Thought discusses the emergence and development of set theory and the set-theoretic approach to mathematics during the period 1850-1940. Rather than focusing on the pivotal figure of Georg Cantor, it analyzes his work and the emergence of transfinite set theory within the broader context of the rise of modern mathematics. The text has a tripartite structure. Part 1, The Emergence of Sets within Mathematics, surveys the initial motivations for a mathematical notion of a set within several branches of the discipline (geometry, algebra, algebraic number theory, real and complex analysis), emphasizing the role played by Riemann in fostering acceptance of the set-theoretic approach. In Part 2, Entering the Labyrinth, attention turns to the earliest theories of sets, their evolution, and their reception by the mathematical community; prominent are the epoch-making contributions of Cantor and Dedekind, and the complex interactions between them. Part 3, In Search of an Axiom System, studies the four-decade period from the discovery of set-theoretic paradoxes to Gödel’s independence results, an era during which set theory gradually became assimilated into mainstream mathematics; particular attention is given to the interactions between axiomatic set theory and modern systems of formal logic, especially the interplay between set theory and type theory. A new Epilogue for this second edition offers further reflections on the foundations of set theory, including the "dichotomy conception" and the well-known iterative conception. "The author paints on a grand scale. He sees clearly, and he sees whole. The result is a spacious canvas full of intriguing scenes and portraits from the history of set theory, seamlessly juxtaposed to form a fascinating and accurate picture of a vast area of modern mathematics. It is a must-have book for anyone who wishes to gain a balanced picture of this history. It is written in clear and elegant language for the learner, while experts in the area will enjoy seeing this beautiful presentation of what they already know, perhaps arguing about some of the author’s conclusions and choices of material." (Roger Cooke, University of Vermont) . Mathematics. History. Mathematical physics. History of Mathematical Sciences. https://scigraph.springernature.com/ontologies/product-market-codes/M23009 Mathematical Physics. https://scigraph.springernature.com/ontologies/product-market-codes/M35000 SpringerLink (Online service) Springer Nature eBook Printed edition: 9783764394172 Printed edition: 9783764383497 https://doi.org/10.1007/978-3-7643-8350-3 ZDB-2-SMA ZDB-2-SXMS Mathematics and Statistics (SpringerNature-11649) Mathematics and Statistics (R0) (SpringerNature-43713)