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Mathematics and the Unexpected Reprint Edition

by Ivar Ekeland (Author)

4.6 9 ratings

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"Not the least unexpected thing about Mathematics and the Unexpected is that a real mathematician should write not just a literate work, but a literary one."—Ian Stewart, New Scientist

"In this brief, elegant treatise, assessable to anyone who likes to think, Ivar Ekelund explains some philosophical implications of recent mathematics. He examines randomness, the geometry involved in making predictions, and why general trends are easy to project (it will snow in January) but particulars are practically impossible (it will snow from 2 p.m. to 5 p.m. on the 21st)."—Village Voice

ISBN-10

0226199908
ISBN-13

978-0226199900
Edition

Reprint
Publisher

University of Chicago Press
Publication date

January 15, 1990
Language

English
Dimensions

8.08 x 5.29 x 0.4 inches
Print length

154 pages
See all details

Ian Stewart
145
Paperback
83 offers from $2.16
Eugenia Cheng
185
Hardcover
31 offers from $10.87

Editorial Reviews

From the Back Cover

In this brief, elegant treatise, accessible to anyone who likes to think, Ivar Ekeland explains some philosophical implications of recent mathematics.

About the Author

Ivar Ekeland is professor of mathematics and economics at the University of British Columbia and director of the Pacific Institute for Mathematical Sciences. He is the author of several books, including Mathematics and the Unexpected and The Broken Dice, both published by the University of Chicago Press.

Product details

Publisher ‏ : ‎ University of Chicago Press; Reprint edition (January 15, 1990)
Language ‏ : ‎ English
Paperback ‏ : ‎ 154 pages
ISBN-10 ‏ : ‎ 0226199908
ISBN-13 ‏ : ‎ 978-0226199900
Item Weight ‏ : ‎ 6.4 ounces
Dimensions ‏ : ‎ 8.08 x 5.29 x 0.4 inches

Best Sellers Rank: #2,421,510 in Books (See Top 100 in Books)
- #1,933 in Physics (Books)
- #6,831 in Mathematics (Books)
- #15,634 in Core

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4.6 9 ratings

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Arty

Beautiful book

Reviewed in the United States on April 22, 2019

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All the concepts are lucidly explained!

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Savannah C.

Good for Mathematicians, Not the General Reader.

Reviewed in the United States on May 16, 2016

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The book was interesting, the second half lost me a little as the author tried to tie in mathematics with poetry sort of haphazardly. I wrote a paper on this book for a proof class that I'm currently in. Probably wouldn't read it again, but it definitely taught me some new things and prompted me to research some of the topics discussed in the book.

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glashoppah

One of the most shocking and easily accessed books on complexity

Reviewed in the United States on November 9, 2021

If you somehow missed the flowering of complexity theory in the 1980s, or if you find a lot of things that appear random to you bewildering and interesting by the fact that they appear to contain some sort of structure, or if you just want to return to the childhood state of pure wonder at revelations about the natural world that you would have never guessed, this is the book for you. The author distills the most important results from complexity theory into easily digested exposition which will lead you from concrete examples to nearly miraculous results. Do you want to know why no one will ever be able to predict the weather? This book is for you.

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Allan Heydon

Reviewed in the United States on January 1, 2003

This fascinating little book -- originally published in French with the subtitle "The Figures of Time from Kepler to Thom" -- deals generally with discoveries related to dynamic systems. The first chapter recounts the history of results related to the granddaddy of dynamic systems: celestial spheres and their orbits. It's a gripping account that places Kepler's and Newton's breakthroughs in context, so that their importance is all the more appreciated. By the end of the 19th century, scientists believed they could accurately predict the location of any planet at any point in time, past or future.
But as Ekeland so well conveys, the haughty hopes of scientism would soon be dashed. The second chapter describes the difficulty -- nay, the impossibility -- of making the required calculations to any accuracy. This is perhaps the most startling part of the book. Even if you have a math and physics education, you may not be aware of the results of Henri Poincaré, who showed among other things that there is no closed-form equation or non-divergent series for expressing the positions of three orbiting bodies in space (the so-called "three body problem"). Ekeland also describes Poincaré's qualitative results, which demonstrated the fractal character of planetary orbits. He then goes on to describe Lorenz's discovery that dynamic systems modeled by even a few simple differential equations exhibit chaotic behavior: a small perturbation in the initial conditions can lead to a vastly different outcome over time. This result re-enforces Ekeland's point that dynamic systems cannot be simulated computationally with any accuracy.
The third chapter describes the results of René Thom's catastrophe theory, which explains why a small change to the configuration of a system can cause it to change states rather dramatically (Thom calls such shifts catastrophes). Ekeland is careful to point out that catastrophe theory applies only to dissipative systems, that is, systems in which stable equilibria are reached due to the dissipation of energy (usually through friction). He also uses a somewhat skeptical tone in describing the more far-fetched areas to which catastrophe theory has been applied by Thom and its other proponents. Nonetheless, catastrophe theory is certainly interesting and does make intuitive sense.
This book is an all-too-rare literate popularization of mathematical ideas. Indeed, literary references abound, especially in the final chapter, which is a long analogy between dynamic systems and Homer's epics The Iliad and The Odyssey. Although I found this analogy a bit strained, I highly recommend the book's first three chapters. In addition to clearly describing a wide variety of mathematical results (using relatively few equations and copius illustrative figures), it also contains a number of surprising little gems. The foreword by Felix Browder is also excellent, putting the rest of the book into appropriate context. Finally, Ekeland has included two fascinating appendices describing other results related to the book's theme, but in slightly more detail.
All in all, this relatively short book (138 pages) packs quite a whollup! I strongly recommend this book to anyone with even the least bit of interest in mathematics or physics. ...

16 people found this helpful

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Michael Wischmeyer

Deceptive Simplicity and Powerful Insight

Reviewed in the United States on May 19, 2002

Occasionally you encounter a book about a subject that you know reasonably well, or least think you do, only to discover that you had little understanding after all. When I first read Ivar Ekeland's "Mathematics and the Unexpected", I was absolutely startled. I knew some physics and math, and I had always assumed that differential equations and physics accurately described nature. Differential equations and physics seemed to go together like bread and butter. Ekeland quickly showed me that I had not really thought about the way differential equations are used in physics.
Ekeland has written a book about mathematics, not a mathematics book. "Mathematics and the Unexpected" does not require familiarity with advanced mathematics and celestial mechanics, and yet Ekeland discusses both topics. The thoughtful reader, rather than becoming confused, will come away with insight into some of the most exciting work in mathematics in the last thirty years. I suspect, however, that the reader knowledgeable of more advanced mathematics will be even more appreciative of Ekeland's achievement.
This is not a new book. Ekeland received the Jean Rostand Prize in 1984 for this outstanding work of scientific popularization. He discusses classical determinism, impossible calculations, deterministic but random systems, unstable but stable systems, and dissipative dynamic systems as he positions us to understand catastrophe theory. In the 1980's catastrophe theory was more controversial as some early proponents had either applied the theory inappropriately or exaggerated its capability. Ekeland concludes with a thoughful critique of catastrophe theory.
I encourage anyone interested in pursuing more recent works (popular or technical) on chaos theory, fractals, or nonlinear dynamics to first read "Mathematics and the Unexpected". Ivar Ekeland has produced "a cultured text with the rare combination of deceptive simplicity and powerful insight" that provides a solid foundation for exploring many contemporary topics in mathematics. The phrase in quotes is from the London Times. This is definitely a five-star book.

19 people found this helpful

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Bukkene Bruse

The Best Popular Math Book I Have Read

Reviewed in the United States on November 24, 1999

As a mathematician who doesn't generally enjoy popular math books, I found Mathematics and the Unexpected to be quite pleasant reading. Instead of being a treatise on the enjoyment of puzzles, I think it conveyed much of how mathematics is integral towards human understanding of the world around us. I have recommended it to my non-mathematician friends, to the point that my copy is on permanent loan.

15 people found this helpful

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