Faticoni, Theodore G. 1954-
The mathematics of infinity : a guide to great ideas / Theodore G. Faticoni. - 2nd ed. - Hoboken, N.J. : John Wiley & Sons, ©2012. - 1 online resource (xv, 338 pages) : illustrations. - Pure and applied mathematics . - Pure and applied mathematics (John Wiley & Sons : Unnumbered) .
Includes bibliographical references and index.
Front Matter -- Logic -- Sets -- Functions -- Counting Infinite Sets -- Infinite Cardinals -- Well-Ordered Sets -- Inductions and Numbers -- Prime Numbers -- Logic and Meta-Mathematics -- Bibliography -- Index -- Wiley Series in Probability and Statistics -- 1. Logic -- 2. Sets -- 3. Functions -- 4. Counting infinite sets -- 5. Infinite cardinals -- 6. Well-ordered sets -- 7. Inductions and numbers -- 8. Prime numbers -- 9. Logic and meta-mathematics.
"Writing with clear knowledge and affection for the subject, the author introduces and explores infinite sets, infinite cardinals, and ordinals, thus challenging the readers' intuitive beliefs about infinity. Requiring little mathematical training and a healthy curiosity, the book presents a user-friendly approach to ideas involving the infinite. Readers will discover the main ideas of infinite cardinals and ordinal numbers without experiencing in-depth mathematical rigor. Classic arguments and illustrative examples are provided throughout the book and are accompanied by a gradual progression of sophisticated notions designed to stun your intuitive view of the world. Infinity, we are told, is as large as things get. This is not entirely true. This book does not refer to infinities, but rather to cardinals. This is to emphasize the point that what you thought you knew about infinity is probably incorrect or imprecise. Since the reader is assumed to be educated in mathematics, but not necessarily mathematically trained, an attempt has been made to convince the reader of the truth of a matter without resorting to the type of rigor found in professional journals. Therefore, the author has accompanied the proofs with illustrative examples. The examples are often a part of a larger proof. Important facts are included and their proofs have been excluded if the author has determined that the proof is beyond the scope of the discussion. For example, it is assumed and not proven within the book that a collection of cardinals is larger than any set or mathematical object. The topics covered within the book cannot be found within any other one book on infinity, and the work succeeds in being the only book on infinite cardinals for the high school educated person. Topical coverage includes: logic and sets; functions; counting infinite sets; infinite cardinals; well ordered sets; inductions and numbers; prime numbers; and logic and meta-mathematics."--
9781118243879 1118243870 1118204484 9781118204481 9781118243824 111824382X
9786613622389
10.1002/9781118243879 Wiley InterScience http://www3.interscience.wiley.com
2011041439
Cardinal numbers.
Set theory.
Infinite.
MATHEMATICS--Infinity.
Mathematics.
Cardinal numbers.
Set theory.
Infinite.
MATHEMATICS--Infinity.
Cardinal numbers.
Infinite.
Set theory.
Mengenlehre
Unendlichkeit
Kardinalzahl
Cardinal numbers.
Set theory.
Infinite.
Electronic books.
Electronic books.
QA248 / .F29 2012
511.3/22
The mathematics of infinity : a guide to great ideas / Theodore G. Faticoni. - 2nd ed. - Hoboken, N.J. : John Wiley & Sons, ©2012. - 1 online resource (xv, 338 pages) : illustrations. - Pure and applied mathematics . - Pure and applied mathematics (John Wiley & Sons : Unnumbered) .
Includes bibliographical references and index.
Front Matter -- Logic -- Sets -- Functions -- Counting Infinite Sets -- Infinite Cardinals -- Well-Ordered Sets -- Inductions and Numbers -- Prime Numbers -- Logic and Meta-Mathematics -- Bibliography -- Index -- Wiley Series in Probability and Statistics -- 1. Logic -- 2. Sets -- 3. Functions -- 4. Counting infinite sets -- 5. Infinite cardinals -- 6. Well-ordered sets -- 7. Inductions and numbers -- 8. Prime numbers -- 9. Logic and meta-mathematics.
"Writing with clear knowledge and affection for the subject, the author introduces and explores infinite sets, infinite cardinals, and ordinals, thus challenging the readers' intuitive beliefs about infinity. Requiring little mathematical training and a healthy curiosity, the book presents a user-friendly approach to ideas involving the infinite. Readers will discover the main ideas of infinite cardinals and ordinal numbers without experiencing in-depth mathematical rigor. Classic arguments and illustrative examples are provided throughout the book and are accompanied by a gradual progression of sophisticated notions designed to stun your intuitive view of the world. Infinity, we are told, is as large as things get. This is not entirely true. This book does not refer to infinities, but rather to cardinals. This is to emphasize the point that what you thought you knew about infinity is probably incorrect or imprecise. Since the reader is assumed to be educated in mathematics, but not necessarily mathematically trained, an attempt has been made to convince the reader of the truth of a matter without resorting to the type of rigor found in professional journals. Therefore, the author has accompanied the proofs with illustrative examples. The examples are often a part of a larger proof. Important facts are included and their proofs have been excluded if the author has determined that the proof is beyond the scope of the discussion. For example, it is assumed and not proven within the book that a collection of cardinals is larger than any set or mathematical object. The topics covered within the book cannot be found within any other one book on infinity, and the work succeeds in being the only book on infinite cardinals for the high school educated person. Topical coverage includes: logic and sets; functions; counting infinite sets; infinite cardinals; well ordered sets; inductions and numbers; prime numbers; and logic and meta-mathematics."--
9781118243879 1118243870 1118204484 9781118204481 9781118243824 111824382X
9786613622389
10.1002/9781118243879 Wiley InterScience http://www3.interscience.wiley.com
2011041439
Cardinal numbers.
Set theory.
Infinite.
MATHEMATICS--Infinity.
Mathematics.
Cardinal numbers.
Set theory.
Infinite.
MATHEMATICS--Infinity.
Cardinal numbers.
Infinite.
Set theory.
Mengenlehre
Unendlichkeit
Kardinalzahl
Cardinal numbers.
Set theory.
Infinite.
Electronic books.
Electronic books.
QA248 / .F29 2012
511.3/22