I just graduated from a regional university in the US with a minor in mathematics. There is a masters program overseas, for economics, that I want to attend but they require applicants to take the Math subject GRE. I have never had a formal introduction to abstract algebra or to topology. I have some time to take the GRE next year, I understand it is only administered three times a year.
My question is, would the following be a good selection of textbooks to self-study intensively for say, six months?
Apostol Volume 1,2
Dummit Foote Abstract Algebra
Munkres Topology, just up to chapter 3
- Rudin Analysis
I did take an Advanced Calculus course, but dropped it. I really wanted an A in the course and was headed for a B-.
I have found some lecture notes online, plus videos such as Harvard's algebra course online. Also, I planned on asking questions here if I got stumped or confused in the more abstract material.
Would going through these books be sufficient? It seems like the entire undergrad in math, except for things like number theory...should I even care about that?
Thank you.
The Math Subject GRE is 50% Calc 1, 2, 3, and Differential Equations. High school algebra and linear algebra are another 15-20% probably. If you do well on just those questions, you will be in the 70th or 80th percentile. Note, this is compared to students wanting to study math at graduate school, so this is very good. Learning several entirely new subject will take months, probably more time than you have, and will end up adding just a few points to your score. Mastering the subjects you have already had will help your score much more.
Here is a link to a previous test, including the breakdown of subjects.
http://www.ets.org/Media/Tests/GRE/pdf/Math.pdf
Note 25% is "Additional Topics". You'd need to learn several semester courses worth of material to get this stuff. Don't worry about that.