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In this new textbook, acclaimed author John Stillwell presents a lucid introduction to Lie theory suitable for junior and senior level undergraduates. In order to achieve this, he focuses on the so-called "classical groups'' that capture the symmetries of real, complex, and quaternion spaces. These symmetry groups may be represented by matrices, which allows them to be studied by elementary methods from calculus and linear algebra.
This naive approach to Lie theory is originally due to von Neumann, and it is now possible to streamline it by using standard results of undergraduate mathematics. To compensate for the limitations of the naive approach, end of chapter discussions introduce important results beyond those proved in the book, as part of an informal sketch of Lie theory and its history.
John Stillwell is Professor of Mathematics at the University of San Francisco. He is the author of several highly regarded books published by Springer, including The Four Pillars of Geometry (2005), Elements of Number Theory (2003), Mathematics and Its History (Second Edition, 2002), Numbers and Geometry (1998) and Elements of Algebra (1994).
- Sales Rank: #352273 in Books
- Published on: 2008-07-24
- Original language: English
- Number of items: 1
- Dimensions: 9.21" h x .56" w x 6.14" l, 1.00 pounds
- Binding: Hardcover
- 218 pages
Review
From the reviews:
“An excellent read. In just 200 pages the author explains what Lie groups and algebras actually are. … An undergraduate who has taken the calculus series, had a course in linear algebra that discusses matrices, has some knowledge of complex variables and some understanding of group theory should easily follow the material to this point. … the best book to get you going.” (Philosophy, Religion and Science Book Reviews, bookinspections.wordpress.com, July, 2013)
“There are several aspects of Stillwell’s book that I particularly appreciate. He keeps the sections very short and straightforward, with a few exercises at the end of each to cement understanding. The theory is built up in small bites. He develops an intuition for what is happening by starting with very simple examples and building toward more complicated groups. … In short, if you want to teach an undergraduate course on Lie theory, I recommend Stillwell.”(David Bressoud, The UMAP Journal, Vol. 31 (4), 2010)
"Lie theory, basically the study of continuous symmetry, certainly occupies a central position in modern mathematics … . In Naive Lie Theory, Stillwell (Univ. of San Franciso) concentrates on the simplest examples and stops short of representation theory … . Summing Up: Recommended. Upper-division undergraduates and graduate students." (D. V. Feldman, Choice, Vol. 46 (9), May, 2009)
"This book provides an introduction to Lie groups and Lie algebras suitable for undergraduates having no more background than calculus and linear algebra. … Each chapter concludes with a lively and informative account of the history behind the mathematics in it. The author writes in a clear and engaging style … . The book is a welcome addition to the literature in representation theory." (William M. McGovern, Mathematical Reviews, Issue 2009 g)
"This is a beautifully clear exposition of the main points of Lie theory, aimed at undergraduates who have … calculus and linear algebra. … The book is well equipped with examples … . The book has a very strong geometric flavor, both in the use of rotation groups and in the connection between Lie algebras and Lie groups." (Allen Stenger, The Mathematical Association of America, October, 2008)
From the Back Cover
In this new textbook, acclaimed author John Stillwell presents a lucid introduction to Lie theory suitable for junior and senior level undergraduates. In order to achieve this, he focuses on the so-called "classical groups'' that capture the symmetries of real, complex, and quaternion spaces. These symmetry groups may be represented by matrices, which allows them to be studied by elementary methods from calculus and linear algebra.
This naive approach to Lie theory is originally due to von Neumann, and it is now possible to streamline it by using standard results of undergraduate mathematics. To compensate for the limitations of the naive approach, end of chapter discussions introduce important results beyond those proved in the book, as part of an informal sketch of Lie theory and its history.
John Stillwell is Professor of Mathematics at the University of San Francisco. He is the author of several highly regarded books published by Springer, including The Four Pillars of Geometry (2005), Elements of Number Theory (2003), Mathematics and Its History (Second Edition, 2002), Numbers and Geometry (1998) and Elements of Algebra (1994).
Most helpful customer reviews
59 of 61 people found the following review helpful.
An excellent introduction to Lie Theory
By Hedin Peter
I'm no expert in Lie groups or Lie algebras, I didn't read any of that stuff in my M. Sc. Eng. Phys. so i decided to try Professor Stilwells book as an introduction to the subject. I am very glad that I bought this book. What Prof. Stilwell promises in the foreword is true - you can read and understand this book with a background of only calculus and linear algebra. The book introduces a lot of advanced concepts, but in a very clear and logic way - there is no problem for an undergraduate to comprehend the material. I guess the book is meant to be a school text book - it was a little hard for me to try to self-study some of the excercises, because there are no solutions provided. I like that every chapter starts with a preview to give an orientation of what will be presented in the chapter. Every chapter also ends with a discussion, which gives historical aspects of the presented theory, and some suggestions for further litterature on the various subjects. This is nice - it gives a wider perspective to the subject. I think this book is a very good stepping-stone on the reader's way from undergrad math to graduate topics, and I hope there will be more books of this kind.
3 of 3 people found the following review helpful.
terrible printing quality, mediocre binding
By Jacob Rus
This review is about the print quality of the book I bought from Amazon, not about the written content.
Apparently now most (all?) Springer books bought via Amazon are printed on demand. It’s unclear whether the printing is done by Amazon or by Springer, but anyway, the quality of the copy I got was terrible. Somewhere between newsprint and a home inkjet printer set to “draft” mode.
I returned it, and bought a cheaper used copy from a British seller. That copy turned out to also be a printed-on-demand book, but printed in Germany, and much higher quality. Looks like it was printed on a laser printer. Still glued binding though.
For the price Springer/Amazon charges for math books, the quality is in my opinion scandalous. Might as well just download a PDF and print it yourself at the local copy shop.
39 of 41 people found the following review helpful.
Excellent read
By Rick Martinelli
An excellent read. In just 200 pages the author explains what Lie groups and algebras actually are. Most books on Lie theory are aimed at professional mathematicians, so begin with lots of topological and algebraic preliminaries and finally define a Lie group as a group that is also a manifold, or something similar. Stillwell begins with an example of the simplest Lie group, SO(2), as a group of rotations in the circle, then proceeds methodically to the next example SU(2), the first non-commutative Lie group. In short order all the other classical groups are discussed and, in chapter 5, the concepts of tangent space and Lie algebra are made clear through more examples. An undergraduate who has taken the calculus series, had a course in linear algebra that discusses matrices, has some knowledge of complex variables and some understanding of group theory should easily follow the material to this point. Topology, usually a graduate topic, is introduced later while showing which Lie groups are simply-connected, and how this is used to distinguish between similar Lie groups.
The material was clearly discussed and I found only a couple of typos. But I also found the use of the word vector and matrix for the same object in the same paragraph somewhat dis-quieting. Lastly, I would have liked to have seen some mention of Lie theory connections with modern physics.
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