MathOverflow is a question and answer site for professional mathematicians. Join them; it only takes a minute:

Sign up
Here's how it works:
  1. Anybody can ask a question
  2. Anybody can answer
  3. The best answers are voted up and rise to the top

What are some good undergraduate level books, particularly good introductions to (Real and Complex) Analysis, Linear Algebra, Algebra or Differential/Integral Equations (but books in any undergraduate level topic would also be much appreciated)?

EDIT: More topics (Affine, Euclidian, Hyperbolic, Descriptive & Diferential Geometry, Probability and Statistics, Numerical Mathematics, Distributions and Partial Equations, Topology, Algebraic Topology, Mathematical Logic etc)

Please post only one book per answer so that people can easily vote the books up/down and we get a nice sorted list. If possible post a link to the book itself (if it is freely available online) or to its amazon or google books page.

share|cite|improve this question

closed as no longer relevant by Harry Gindi, Robin Chapman, Greg Stevenson, Harald Hanche-Olsen, Scott Morrison Jul 11 '10 at 13:29

This question is unlikely to help any future visitors; it is only relevant to a small geographic area, a specific moment in time, or an extraordinarily narrow situation that is not generally applicable to the worldwide audience of the internet. For help making this question more broadly applicable, visit the help center.If this question can be reworded to fit the rules in the help center, please edit the question.

    
This is borderline, but I think it is a legitimate question of interest to math instructors. I think its better as a community wiki though. – David Zureick-Brown Oct 16 '09 at 17:28
    
OK... Do I need to do something to make it a community wiki or is it already like that? – person Oct 16 '09 at 18:04
    
@person: Normally, to make a question or answer community wiki, you click the "community wiki" checkbox in the lower-right when you're composing or editing. But moderators have the power to convert a post to community wiki, which is what David has done here (actually, three moderators independently thought it should be converted to CW ... it's not something we do willy-nilly), so you don't need to do anything. – Anton Geraschenko Oct 16 '09 at 18:15
6  
It's no longer possible to add useful answers to this question (as there are too many!) and it's unclear whether this question would be "allowed" by modern standards -- far too broad. As it's been popping back to the front page fairly frequently, we've decided to close it. – Scott Morrison Jul 11 '10 at 13:30
7  
See discussion on meta: tea.mathoverflow.net/discussion/499/… (and remember to vote this comment up, so it is visible to others) – Victor Protsak Jul 14 '10 at 10:34

96 Answers 96

Galois Theory by Ian Stewart is excellent. The third edition is quite different from the second and includes many more problems.


share|cite|improve this answer
    
it has certain amount of typos (reflected by other students in bard). – Kerry Jul 22 '10 at 4:25

Algebra: Chapter 0, Paolo Aluffi

Best book on algebra I've had my hands on yet, and I love how it uses category theory. I wouldn't mind having a course taught from this one. Topics from group theory all the way through field theory, linear algebra, and homology. This book deserves more attention!

http://www.amazon.com/Algebra-Chapter-Graduate-Studies-Mathematics/dp/0821847813/ref=sr_1_1?ie=UTF8&s=books&qid=1278799249&sr=8-1

share|cite|improve this answer
1  
Terrific book for first year graduate algebra or honors undergraduate. – The Mathemagician Jul 10 '10 at 22:23

Searcóid: Elements of Abstract Analysis. I loved this book as an undergraduate, for many reasons, but mainly because it gave me an idea of the unity of mathematics. It starts from the axioms of set theory and takes you all the way to C*-algebras and the Gelfand-Naimark theorem. Here's the Google Books page.

share|cite|improve this answer
    
<pedant> The name is actually "Ó Searcóid" (cf. names like O'Grady, which are Anglicised versions of the same form).</pedant> Anyway, nice choice – user5117 May 25 '10 at 7:07

Jaenich: "Topology"

Introduces the concepts of point set topology ("paracompact" and all this stuff) motivating each via examples which are rigorously defined but also drawn. Other advantage: It is short!

share|cite|improve this answer
    
It's also great for someone trying to learn mathematical German! (not that that's terribly useful anymore... ><) – Michael Hoffman Oct 30 '09 at 13:31
    
I particularly love his proof of the Urysohn's lemma: the presentation of the main idea of the proof is brilliant, simple and clear. – a.r. Oct 30 '09 at 19:31
    
I am SO totally pumped people are finally rediscovering this classic! – The Mathemagician Mar 18 '10 at 20:45

Bartle "The Elements of Integration and Lebesgue Measure"

share|cite|improve this answer
    
Excellent book, especially for an undergrad course. One of my favorite parts of the book was his diagrams for modes of convergence: johndcook.com/modes_of_convergence.html – John D. Cook Jul 10 '10 at 21:10

I am surprised this has not been mentioned before (is it too advanced?):

Bott and Tu, Differential forms in algebraic topology.

The best introduction to de Rham cohomology, spectral sequences, characteristic classes from the algebraic point of view, and countless other topics.

share|cite|improve this answer
    
Certainly true,but unless your undergraduates are in Germany or at Harvard,that book is definitely too tough for this list. – The Mathemagician May 25 '10 at 4:14
    
Hey, I was an undergraduate in Moscow. Does that count? – Victor Protsak May 25 '10 at 4:27
2  
... and seeing that Hatcher, Serre, Jacobson, Alperin, and Evans have been featured (some at the very top), I don't agree that it's "too tough for this list". – Victor Protsak May 25 '10 at 4:33
    
Yes-and with the POSSIBLE exception of Hatcher,none of them belong on a general reading list for undergraduates,Victor. You studied in a VERY strong program and you need to be a bit more mindful of that when making such lofty aspairations for mere mortals.And that goes for quite a few people in here. – The Mathemagician May 25 '10 at 11:55

Real Mathematical Analysis by Charles Pugh

share|cite|improve this answer
1  
Thank you,someone finally mentioned this book.I'm hoping it supplants baby Rudin eventually.I affectionally call it "Rudin Done Right". – The Mathemagician Mar 18 '10 at 20:47

Lectures on Linear Algebra by I. M. Gel'fand

share|cite|improve this answer

Also, I just started this book and absolutely love it

Geometry: Euclid and Beyond, Hartshorne

share|cite|improve this answer

For a thorough introduction on Partial Differential Equations, read L.C. Evans, "Partial Differential Equations". Features both linear and nonlinear equations.

share|cite|improve this answer
    
that book is very good. For a 1st or 2nd year undergraduate, perhaps a slightly more accessible book is Haberman - "Applied Partial Differential equations"; admitted it is "applied", but it overlaps heavily with pure PDEs and has many "pure" techniques. – Vinoth Dec 21 '09 at 4:57
    
Evan's is a great GRADUATE level text. Most undergraduates would be like,"huh?" A much better choice is the long out of print Robert L.Street's "Analysis And Solution Of Partial Differential Equations". – The Mathemagician Mar 18 '10 at 20:34
    
@Andrew L: while the book is clearly meant for graduate students, it is also suitable for undergrads, especially the first chapters (and omitting the "omit on first reading" parts). With appropriate supervision, even some of the nonlinear chapters can be read by undergrads. – Martijn Mar 23 '10 at 7:37
    
@Martijn,those would have to be VERY good undergraduates indeed and you'd have to be REALLY selective with it. – The Mathemagician Mar 27 '10 at 21:48
    
That's quite a hefty book. I think undergrads would be better served by covering a less ambitious book rather than not getting very far into Evans. – John D. Cook Jul 10 '10 at 21:12

For a long time, Kolmogorov-Fomin's Introductory Real Analysis was my standard for a great mahtematics textbook. I can't imagine a better introduction to serious analysis.

The translation I'm linking to is very good, and includes excercises (the original has many fewer), but it is incomplete (it's missing the chapter on Fourier Series). So if you can read Russian, I recommend you get the original.

share|cite|improve this answer
    
You know,it's interesting you should approve so strongly of the Silverman translation of the Kolomogrov/Fomin text,Ilya. A lot of Russian mathematicians I've brought it up to tell me Silverman should be hanged for ruining such a classic.Guess you can't please everyone. – The Mathemagician Mar 28 '10 at 5:26

I'm a big fan of John Hubbard's "Vector Calculus, Linear Algebra and Differential Forms" text. I was a TA for the course twice at Cornell and was amazed at how well it went. The text has an extremely pleasant "zest" to it. When Hubbard asked me to take a look at it my first response was the text is "overflowing with the spirit of calculus". I still believe that. I have a hard time containing my praise.

The main problem with the text is that it's so engrossing. It places more demands on the student than a traditional service course text would ever consider. But it's also far more rewarding. At Cornell it was taught as a branch of their traditional calculus sequence -- it was a course that was earmarked for keener students, mostly from other departments.

In short, if you want to have physics, engineering and economics students appreciating the derivative as a linear approximation, thinking Lipschitz bounds for functions are cool, being interested in the computation of norms of linear operators, etc, this is a great resource.

share|cite|improve this answer
    
There are "undergraduate" texts that are so deep with ideas and concepts that anyone of any level can learn from them. Books like this are Spivak's classic "Calculus On Manfolds",Janich's "Topology",Hoffman's "Analysis In Euclidean Space" and more recently McCleary's "A First Course In Topology:Continuity And Dimension". Hubbard and Hubbard CERTAINLY belongs in that select group. – The Mathemagician Mar 18 '10 at 20:31
    
John Hubbard is DA MAN!!! – Victor Protsak May 24 '10 at 6:05

Linear Algebra / Hoffman & Kunze - A book that truly develops linear algebra in a gradual manner. It starts with a basic discussion of systems of linear equations, matrices, Gaussian elimination, etc. and gradually progresses to the more abstract theory. Eventually it even touches upon subjects such as tensor products, the exterior algebra and the Grassmann ring. In short, it manages to cover a lot of linear algebra in a very leisurely and clear manner. I think that this is the quintessential example of a how an undergraduate level math book should be written. The only thing I don't like about it is the fact that quotient spaces aren't mentioned throughout the book (they're mentioned in the appendix, though).

share|cite|improve this answer
    
I'd LOVE to teach a one year honors course in linear algebra using the union of both H&K and Strang. A truly balanced course that shows how both aspects of the subject-theory and applications-are equally important. – The Mathemagician Jul 11 '10 at 0:30

Subject: FUNCTIONAL ANALYSIS

Erwin Kreyszig

Introductory Functional Analysis with Applications

share|cite|improve this answer

E. Hairer, G. Wanner: Analysis by its history for an introduction to real and numerical analysis from a historical point of view.

share|cite|improve this answer

Alexandre Stefanov keeps an extensive list of free math books / lecture notes. The list is divided according to subject and updated frequently. I have found some very nice books there.

share|cite|improve this answer
    
that link doesn't work! could you try posting it again? – Aaron Mazel-Gee Oct 23 '09 at 18:09
    
Thanks for letting me know of the broken link. It now works. – Henning Arnór Úlfarsson Nov 6 '09 at 21:48

Kock, Vainsencher: An invitation to Quantum Cohomology.

Written in the most friendly and motivating style I have ever seen in a book. Almost has no prerequisites: You should that there exists something like algebraic varieties - without having to know any technical details - and that P^1 is such a thing. Everything else is provided in easy exercises or the text. It gives an excellent intuition about the subject with lots of outlooks on a field of current research, and at the same time manages to be easily undergraduate readable.

share|cite|improve this answer

From the quick look I've had, not much representation theory has been mentioned so here goes for undergrad level rep theory (perhaps suitable for 3rd/4th year in a standard sequence of undergraduate study), roughly in the order of difficulty (from easiest to hardest):

  • James & Liebeck - "Representations and Characters of Groups" (a very good introduction)

  • Sagan - "The symmetric group: representations, combinatorial algorithms, and symmetric functions"; (the first two chapters here at least are representation theory) OR James & Kerber - "Representation Theory of the Symmetric Group" (this one includes some modular representations of $S_n$)

  • Alperin - "Local Representation Theory" (basically, modular representation theory)

  • Hall - "Lie groups, Lie Algebras and Representation Theory" (a solid introduction to Lie theory); for a more advanced perspective Harris & Fulton - "Representation Theory: A first course" (but it could be slightly terse at points, but not necessarily)

For algebraic geometry, the one book I'd suggest is "Algebraic Geometry: A first course" by Joe Harris, very nice and full of examples. For algebraic number theory, a very good introduction is Janusz - "Algebraic Number Fields" (followed perhaps by Childress - "Class Field Theory", or Silverman - "The Arithmetic of Elliptic Curves" to go in a slightly different direction).

share|cite|improve this answer

Karen Smith et al., An Invitation to Algebraic Geometry

share|cite|improve this answer
1  
Since I haven't looked at this book but might be interested... This book is "undergraduate level" for whom? Presumably, many Harvard senior math majors would be able to tackle it. How many senior math majors at a mid-tier public research university? mid-tier liberal arts college? compass point state college? – Alexander Woo Dec 28 '09 at 21:23
    
(off-topic comment deleted) – S. Carnahan Aug 11 '10 at 13:45

Here is an undergraduate level math book recommendation from an early undergrad's position:

I like "Linear Algebra Done Right". I've looked at a bunch of books on linear algebra, and the usual matrix approach is to me a big turn-off when what you're really interested in is the abstract machinery of transformations between vector spaces. I'm not a research mathematician. In fact, I don't even study linear algebra yet, but as a student of mathematics that like algebra, spaces, maps and all that good stuff, I find this to be a very readable account of linear algebra.

There are more abstract books on the subject, and my impression is that LADR prepares you for the next level way before you're usually "allowed to" by other accounts like Lax etc. The trade-off is that LADR is not a book for engineers, but this would be a sad world for a mathematician if that was something he had to worry about (in his spare time). Great for self-study. Reads like a novel. I'd probably prefer it if Axler used sets for span and bases instead of lists, but that's something you'll probably be able to shake off with the next book you read on the subject.

share|cite|improve this answer
1  
See the other answer on this book for my comments. – Gerald Edgar Dec 28 '09 at 15:24
    
I'm not sure I agree your comments warrants a vote-down for this one. I still think it's a good book (for people who wants to learn mathematics for the benefit of mathematics), and my position for what I want the book to do is clear and I think it accomplishes it. – Eivind Dahl Dec 28 '09 at 15:43

There is a good list here, divided by subject, that also contains many links to freely available textbooks and lecture notes.

share|cite|improve this answer
    
can't see anything here - where is the list? – vonjd Oct 30 '09 at 13:03
    
...perhabs it is because I don't speak chinese... – vonjd Oct 30 '09 at 13:04

Kelley, General Topology

share|cite|improve this answer

Linear Algebra and Its Applications by Gilbert Strang. You can also watch his video lectures at MIT OpenCourseWare

share|cite|improve this answer

"Introduction to Mathematical Logic" by Ebbinghaus, Flum and Thomas

Careful introduction, addresses many doubts that one might have about why one does logic in this way and not some other, e.g. whether one is doing something circular when formulating set theory in 1st order logic, or e.g. it proves Lindstroem's Theorem, that says that classical 1st order logic has the highest power of expressability among the logics with completeness and Loewenheim-Skolem.

share|cite|improve this answer

Metric Spaces by Mícheál Ó Searcóid

http://www.amazon.com/Metric-Spaces-Springer-Undergraduate-Mathematics/dp/1846283698/ref=sr_1_1?ie=UTF8&s=books&qid=1256082496&sr=1-1

It's an exhaustive introduction analysis at the level of the metric space that's well worth reading.

share|cite|improve this answer

Introduction to Analysis by William R. Wade

http://www.amazon.com/Introduction-Analysis-4th-William-Wade/dp/0132296381/ref=sr_1_1?ie=UTF8&s=books&qid=1256082707&sr=1-1

This is a good transition from undergraduate calculus to analysis.

share|cite|improve this answer

Not the answer you're looking for? Browse other questions tagged or ask your own question.