Overview

Since their appearance in the late 19th century, the Cantor--Dedekind theory of real numbers and philosophy of the continuum have emerged as pillars of standard mathematical philosophy. On the other hand, this period also witnessed the emergence of a variety of alternative theories of real numbers and corresponding theories of continua, as well as non-Archimedean geometry, non-standard analysis, and a number of important generalizations of the system of real numbers, some of which have been described as arithmetic continua of one type or another. With the exception of E.W. Hobson's essay, which is concerned with the ideas of Cantor and Dedekind and their reception at the turn of the century, the papers in the present collection are either concerned with or are contributions to, the latter groups of studies. All the contributors are outstanding authorities in their respective fields, and the essays, which are directed to historians and philosophers of mathematics as well as to mathematicians who are concerned with the foundations of their subject, are preceded by a lengthy historical introduction.

Full Product Details

Author:   P. Ehrlich
Publisher:   Springer
Imprint:   Springer
Edition:   Softcover reprint of hardcover 1st ed. 1994
Volume:   242
Dimensions:   Width: 15.20cm , Height: 1.70cm , Length: 22.90cm
Weight:   0.491kg
ISBN:  

9789048143627

ISBN 10:   9048143624
Pages:   288
Publication Date:   07 December 2010
Audience:   Professional and scholarly ,  Professional & Vocational
Format:   Paperback
Publisher's Status:   Active
Availability:   In Print  
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Table of Contents

I. The Cantor-Dedekind Philosophy and Its Early Reception.- On the Infinite and the Infinitesimal in Mathematical Analysis (Presidential Address to the London Mathematical Society, November 13, 1902).- II. Alternative Theories of Real Numbers.- A Constructive Look at the Real Number Line.- The Surreals and Reals.- III. Extensions and Generalizations of the Ordered Field of Reals: The Late 19th-Century Geometrical Motivation.- Veronese’s Non-Archimedean Linear Continuum.- Review of Hilbert’s Foundations of Geometry (1902): Translated for the American Mathematical Society by E. V. Huntington (1903).- On Non-Archimedean Geometry. Invited Address to the 4th International Congress of Mathematicians, Rome, April 1908. Translated by Mathieu Marion (with editorial notes by Philip Ehrlich).- IV. Extensions and Generalizations of the Reals: Some 20th-Century Developments.- Calculation, Order and Continuity.- The Hyperreal Line.- All Numbers Great and Small.- Rational and Real Ordinal Numbers.- Index of Names.

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