Which Numbers Are Real? - Michael Henle

Which Numbers Are Real?

(Autor)

Buch | Hardcover
229 Seiten
2012
Mathematical Association of America (Verlag)
978-0-88385-777-9 (ISBN)
64,80 inkl. MwSt
This book explores alternative number systems that generalise the real numbers yet stay close to the properties that make the real numbers the fundamental quantities of mathematics. These exciting and sometimes eccentric number systems are active areas of research and will be of interest to students and teachers of mathematics.
The set of real numbers is one of the fundamental concepts of mathematics. This book surveys alternative number systems: systems that generalise the real numbers yet stay close to the properties that make the reals central to mathematics. There are many alternative number systems, such as multidimensional numbers (complex numbers, quarternions), infinitely small and infinitely large numbers (hyperreal numbers) and numbers that represent positions in games (surreal numbers). Each system has a well-developed theory with applications in other areas of mathematics and science. They all feature in active areas of research and each has unique features that are explored in this book. Alternative number systems reveal the central role of the real numbers and motivate some exciting and eccentric areas of mathematics. What Numbers Are Real? will be an illuminating read for anyone with an interest in numbers, but specifically for advanced undergraduates, graduate students and teachers of university-level mathematics.

Michael Henle is Professor of Mathematics and Computer Science at Oberlin College and has had two visiting appointments, at Howard University and the Massachusetts Institute of Technology, as well as two semesters teaching in London in Oberlin's own program. He is the author of two books: A Combinatorial Introduction to Topology (W. H. Freeman and Co., 1978, reissued by Dover Publications, 1994) and Modern Geometries: The Analytic Approach (Prentice-Hall, 1996). He is currently editor of The College Mathematics Journal.

Introduction; Part I. The Reals: 1. Axioms for the reals; 2. Construction of the reals; Part II. Multidimensional Numbers: 3. The complex numbers; 4. The quaternions; Part III. Alternative Lines: 5. The constructive reals; 6. The hyperreals; 7. The surreals; Bibliography; Index.

Reihe/Serie Classroom Resource Materials
Verlagsort Washington
Sprache englisch
Maße 157 x 235 mm
Gewicht 430 g
Themenwelt Mathematik / Informatik Mathematik Algebra
Mathematik / Informatik Mathematik Arithmetik / Zahlentheorie
Mathematik / Informatik Mathematik Logik / Mengenlehre
ISBN-10 0-88385-777-4 / 0883857774
ISBN-13 978-0-88385-777-9 / 9780883857779
Zustand Neuware
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