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

I'm supervising an undergraduate project on Galois theory and covering spaces. I want to have him read about the fact that from a branched cover of a Riemann surface you get an extension of its field of meromorphic functions, and the Galois groups are the same, but I'm having trouble finding a good book. Fulton's "Algebraic Topology" is OK but rushes through this point. Forster's "Lectures on Riemann Surfaces" looks good but I'd rather not make him learn sheaves. Any recommndations?

share|cite|improve this question
What about "Algebre et théories galoisiennes" of A. Douady and R. Douady (if you can read french)? – Henri Feb 17 '12 at 18:00
McKean and Moll's book Elliptic Curves might be a bit elementary but I like their discussion of this a lot. – j.c. Feb 17 '12 at 18:05
@Henri: that would have been my suggestion, too. – Franz Lemmermeyer Feb 17 '12 at 18:06
Douady and Douady is appealing to me, but it's probably too sophisticated for my student - they define the field of meromorphic functions as a projective limit, for example. McKean and Moll is more the right style, although I'm having trouble finding where they address the fact that I asked about. – Nick Addington Feb 18 '12 at 0:09
Simon Donaldson's new book "Riemann Surfaces" looks very nice if I could scare up a copy... – Nick Addington Feb 18 '12 at 0:20

10 Answers 10

There is a chapter on Riemann surfaces in Tamās Szamuely's book "Galois Groups and Fundamental Groups", which contains the facts that you are looking for.

share|cite|improve this answer
Thanks, although judging by the table of contents it may be too sheafy for an undergrad. Anyway it seems hard to come by - I can't find it in the library or online. – Nick Addington Feb 17 '12 at 23:39
The British library has it (Link 1 below), and I think you can order it via Imperial´s main library. Link 1)… – James O Feb 20 '12 at 13:19

Here are two sources accesible to an undergraduate

1. Michio Kuga: Galois' Dream. Group theory and differential equations, Birkhauser.

It's written with an undergraduate in mind that is not familiar with the fundamental group and/or covering spaces. He does not cover branched covers though.

2. F. Kirwan: Complex Algebraic Curves, London Math. Soc., Student Texts, vol. 23.

share|cite|improve this answer
Thanks, I will check out the Kuga reference. Kirwan doesn't mention Galois groups at all. – Nick Addington Feb 17 '12 at 22:29

I think V.I.Arnold's lectures "Abel's Theorem in Problems and Solutions" may be a great supplementary reading. The book is basic but beautiful.

share|cite|improve this answer
I'm an undergrad who recently started working through this myself. – mmm Feb 17 '12 at 22:01
What a lovely book. Probably too elementary for this student, but I hope I'll find an excuse to use it someday. – Nick Addington Feb 17 '12 at 23:09
There is an apparently different tranaslation of the russina lectures which can be downloaded for free from the website of Sujit Nair. I hope it is allright to point this out here. – Michael Bächtold Oct 19 '12 at 8:54

I like a lot:

Algebraic Curves and Riemann Surfaces by Rick Miranda,

published by the AMS. I think it's very suitable for undergraduates.

share|cite|improve this answer
This doesn't seem to mention anything the Galois group of a branched cover. – Nick Addington Feb 17 '12 at 22:25
In III.2 it describes cyclic covers of the line, III.3 is about group actions on Riemann surfaces, III.4 treats monodromy. All this stuff seems to me closely related to your question. – rita Feb 18 '12 at 10:12

Hi Nick,

Groups as Galois groups by Helmut Völken is a very nice book that I think is suitable for a good undergrad and might have the level you are looking for. I think chapters 4 and 5 are the places where your student should check first, and I think they don't require previous chapters to follow what is there.

Also, Inverse Galois theory by Malle and Matzat is great to see some applications of what he is learning is his project--mainly chapter 1. This one needs more background than the above, so I'm just recommending this one after he has learned the material in the other one.

share|cite|improve this answer

Try Askold Khovanskii: Galois Theory, Coverings and Riemann Surfaces.

share|cite|improve this answer
A new book by the same author just came out: Topological Galois Theory. – Martin Peters Nov 3 '14 at 14:34

The first sections of the following two papers contain background material on covering spaces and Galois theory.

Joe Harris Galois groups of enumerative problems Duke Math. J. Volume 46, Number 4 (1979), 685-724.

William Fulton Hurwitz Schemes and Irreducibility of Moduli of Algebraic Curves. The Annals of Mathematics, Second Series, Vol. 90, No. 3 (Nov., 1969), pp. 542-575

share|cite|improve this answer

Klaus Lamotke: Riemmansche Flächen, Springer, 2009. Very strong on algebraic aspects. (Don't know of anything alike in english, yet.)

share|cite|improve this answer

Approaching the problem from a slightly different position, you could point your student towards a Masters' thesis:

M. A. D. Robalo, 2009, Galois Theory towards Dessins d’Enfants , Master’s thesis, Instituto Superior Technico, Lisboa.

There are some more or small errors, and the aim is slightly different, so the task might then be to rewrite that (slightly too SGA1 based perhaps), to check for errors, adapting it towards the aims that you have in mind and bringing in more Riemann surface stuff.

share|cite|improve this answer

I am not sure but the, "introduction to Compact Riemann Surfaces and Dessins d'Enfants" of Ernesto Girondo & Gabino González-Diez. Could be useful

share|cite|improve this answer

Your Answer


By posting your answer, you agree to the privacy policy and terms of service.

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