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Lynn Arthur Steen (1941–2015)

Author of Counterexamples in Topology

15 Works 499 Members 4 Reviews

About the Author

Image credit: St. Olaf College

Works by Lynn Arthur Steen

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Common Knowledge

Legal name
Steen, Lynn Arthur
Birthdate
1941-01-01
Date of death
2015-06-21
Gender
male
Education
Luther College
Massachusetts Institute of Technology (PhD - Mathematics)
Occupations
mathematician
professor emeritus (Mathematics)
Organizations
St. Olaf College
National Academy of Sciences
Mathematical Association of America (President, 1985-1986)
Awards and honors
Lester R. Ford Award (1973)
Lester R. Ford Award (1974)
Relationships
Mary E. Steen (wife)
Margaret E. Steen (daughter)
Catherine Wille (daughter)
Kenneth Myron Hoffman (PhD advisor)
Short biography
Steen was known among mathematicians for his work in topology and related fields in the 1970's. Then he also became interested in public outreach and mathematics education. He served the 1985-1986 term as president of the MAA.
Nationality
USA
Birthplace
Chicago, Illinois, USA
Places of residence
Staten Island, New York, USA
Place of death
Minneapolis, Minnesota, USA
Associated Place (for map)
USA

Members

Reviews

5 reviews
Topology is abstract enough that if you are learning the subject for the first time, and you are not constantly challenging yourself to come up with concrete applications and counterexamples, you will probably learn very little. If you find the requirements of a particular theorem to be a bit over-the-top and find yourself a few brain cells short of coming up with a proper counterexample to illuminate why the theorem is stated in that way, this book will be extremely useful. Even if you can show more always come up with one, some of these examples may be simpler or more illuminating. And at this price, there is no reason every mathematician should not have a copy. show less
This book contains a dense covering of point-set topology and over a hundred different topologies over different spaces (as per the book count; some of those include more than one topology over the same space, or one topology over several spaces.) You can learn a great deal about topology just from this book without help. While there are no exercises and no proofs, there are plenty of examples to show why one property of a topology is or is not dependent on another. Thinking your way through show more the introduction and examples is a great way to learn.

On the down side, there's a topology paper included as an appendix that has little to do with the book and seems to be included just as an important paper on topology. It's way above my head, and I suspect it will be for many years. Also, the exercises seem randomly ordered, which is less of a problem because they are heavily linked by number from all over the book.
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While some of the references are dated (computers have come a long way since this was written) overall it was a good read. I was intrigued by the concepts of introducing young children to higher mathematics while not teaching them the theory!! I would only recommend this book to those interested in teaching math and science.
Every student of topology should have this. Steen and Seebach provide instances to illustrate every distinction commonly made in topology (e.g. regular but not normal, T1 but not Hausdorff). In the latter part of the book the authors offer a thorough discussion of metrizability (under what conditions can a topological space be given a metric that "agrees" with its topology?).

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Works
15
Members
499
Popularity
#49,588
Rating
½ 4.4
Reviews
4
ISBNs
32

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