Ask HN: Exploring math without a teacher?
Many of my friends easily get interested in the subject when they are shown beautiful proofs and constructs, but I am at loss when they ask for resources to learn more, since we had never used books in our studies. During class, the teacher would show the art of math by proving theorems and building constructs together with the students using only the whiteboard.
I am looking for books or online courses on that are suitable for beginners (while still formal and not dumbed down) and emphasize the beauty and love for math, on the following subjects:
* Intro to sets, mappings, boolean logic, predicate theory
* Number theory
* Rings, fields, groups, vector spaces, Galois theory, etc
* Set theory, measure theory, functional analysis
* Combinatorics, graph theory
* Language theory, lambda calculus
* Other subjects that are not in this list
Books rigorously building the field entirely from ground up (axioms) with detailed looks at all the important proofs with multiple versions and highlighting relations to other fields would be best. It is good if the book has exercises in the form of main story lemmas and side story / related proofs.
Please share your favorite pure math works below.
10 comments
[ 2.7 ms ] story [ 24.0 ms ] threadFor number theory I liked "Number Theory and its History" by Oystein Ore. Best part is it is cheap. Good intro to number theory, it was accessible to me in high school (I was advanced, but no genius) and I learned things that I never even encountered in college as a math major.
[1] http://www.amazon.com/First-Course-Abstract-Algebra-Edition/...
[2] http://www.amazon.com/Introduction-Theory-Computation-Michae...
The first six chapters are online so you can see whether you like the approach: http://www.math.brown.edu/~jhs/frintch1ch6.pdf
http://www.amazon.com/John-Stillwell/e/B001IQWNS2/ref=sr_tc_...
meets your requirement of "It is good if the book has exercises in the form of main story lemmas and side story / related proofs." I like Stillwell's books a lot for readability and starting from the basics.
Btw. we learned most of the stuff above in CompSci throughout the first three semesters. If you ask if it's worth the money: "To be honest, all I did was learn the "script" and "Wikipedia"." You can do better at home. In some cases I needed more info, when Wikipedia went mad about unnecessary "details".
http://www.youtube.com/playlist?list=PL0E754696F72137EC
These could go with the either the book by W. Rudin or (haven't read) A. Browder. These are not easy for a complete beginner; maybe the lectures can provide some motivation. "Understanding Analysis" by S. Abbott is another rigorous and much easier, but very good, introduction.
"Advanced calculus" by Shlomo Sternberg ... a work of profound beauty. This was the book used at Harvard in the 60s for the best freshman students, but it begins in a slow yet deep way with sets, logic, linear algebra, calculus, metric spaces... It's my favourite book on calculus on manifolds. http://www.math.harvard.edu/~shlomo/
Some freely available books by Robert Ash: http://www.math.uiuc.edu/~r-ash/ - in particular, his misleadingly-named "Complex variables" (with W.P. Novinger) is a short, rigorous book on complex analysis.
"Naive Set Theory" by Paul Halmos is now available for something like $12.
(I have not read the following books.)
For number theory, maybe the book by George Andrews? It's very elementary and very cheap, and looks top notch.
I'd like to read "The Cauchy-Schwartz master class" (on inequalities) but haven't purchased it yet.
There are many books on combinatorics and graphs by the Hungarian school. Probably deserving special attention for discrete math are "Concrete mathematics" by Knuth et al. and "Analysis of algorithms" by Sedgewick and Flajolet (distinct from Sedgewick's "Algorithms").
Also, I enthusiastically second tokenadult's recommendations of all of Stillwell's books, which has quite rightly been voted to the top.