Contributions to the Founding of the Theory of Transfinite Numbers [Paperback]

George Cantor (Author), Philip E.B. Jourdain (Introduction)

Book Description

Publication Date: May 1, 2007

"In it, Jourdain outlines the contributions of many of Cantor¿s forerunners¿including Fourier, Dirichlet, Cauchy, Weierstrass, Riemann, Dedekind, and Hankel¿and then further contextualizes Cantor¿s groundbreaking theory by recounting and examining his earlier work. In this volume, Cantor addresses: ¿ the addition and multiplication of powers ¿ the exponentiation of powers ¿ the finite cardinal numbers ¿ the smallest transfinite cardinal number aleph-zero ¿ addition and multiplication of ordinal types ¿ well-ordered aggregates ¿ the ordinal numbers of well-ordered aggregates ¿ and much more. German mathematician GEORG CANTOR (1845-1918) is best remembered for formulating set theory. His work was considered controversial at the time, but today he is widely recognized for his important contributions to the field of mathematics."

Product Details

• Paperback: 224 pages
• Publisher: Cosimo Classics (May 1, 2007)
• Language: English
• ISBN-10: 1602064423
• ISBN-13: 978-1602064423
• Product Dimensions: 7.9 x 5 x 0.7 inches
• Shipping Weight: 8 ounces (View shipping rates and policies)
• Average Customer Review: 4.0 out of 5 stars  See all reviews (2 customer reviews)
• Amazon Best Sellers Rank: #2,112,252 in Books (See Top 100 in Books)

Customer Reviews

Most Helpful Customer Reviews

46 of 47 people found the following review helpful:

4.0 out of 5 stars An interesting book, August 28, 1999

By A Customer

This review is from: Contributions to the Founding of the Theory of Transfinite Numbers (Dover Books on Mathematics) (Paperback)

There's nothing like reading the original. Here is the abstract theory of transfinite ordinals described by its originator, Georg Cantor.

It's probably not the best introduction to set theory for a beginner. The book focuses more on ordinal numbers than on cardinals or general sets. It's not a great reference, either, since so many important results in set theory have been proven in the 100 years since Cantor. But I like this book a lot nonetheless. The exposition is beautiful -- concise, clear, and logical. It's one of the most nicely presented math books I've read.

21 of 21 people found the following review helpful:

4.0 out of 5 stars Detailed Axiomatic Development of Transfinite Numbers - Not Suitable as Introduction, August 25, 2006

By 

Michael Wischmeyer (Houston, Texas) - See all my reviews
(VINE VOICE)    (REAL NAME)   

This review is from: Contributions to the Founding of the Theory of Transfinite Numbers (Dover Books on Mathematics) (Paperback)

Georg Cantor's final and logically purified memoir on transfinite numbers was published in the late 1890s. This Dover reprint is the 1915 English translation by the mathematician Philip E. B. Jourdain; it also includes a lengthy, technically diffcult introduction by Jourdain.

Contributions to the Founding of the Theory of Transfinite Numbers is not suitable as an introduction. I unwisely disregarded caution from an earlier reviewer that Cantor's work would not be appropriate for a beginner in set theory. (I thought that I was reasonably acquainted with set theory, but I do admit that I was not a math major.)

The 82-page introduction by Jourdain assumes that the reader is reasonably familiar with the work of key nineteenth century mathematicians. While it is possible to skip the introduction, Jourdain's context setting is quite helpful. Cantor's transfinite numbers are so innovative and so unexpected that it almost seems as though they spring forth in a vacuum, but Jourdain shows that the earlier work of Dirichlet, Cauchy, Riemann, and Weierstrass helped point the way for Cantor.

Cantor's memoir (that is, his two-part discussion of transfinite number theory) comprise the remaining 125 pages. The difficulty with Cantor's axiomatic presentation is two-fold. First, the material itself is not easy - despite Cantor's careful approach. I even bogged down for awhile on his early discussion of the exponentiation of powers and how this leads to aleph-zero. And second, much of his terminology is outdated and unfamiliar. For example, there is no mention of sets, just aggregates and parts. Another example is that Cantor speaks of reciprocal and univocal correspondence. I have yet to complete Cantor's work, but I am continuing to plod along.

A recommendation: A much better starting point for readers new to transfinite numbers is a fascinating book by Mary Tiles, titled The Philosophy of Set Theory - An Historical Introduction to Cantor's Paradise. This work targets mathematics and philosophy majors, but is accessible to others.