I am supervising a small reading group on Riemann surfaces. We are following Rick Miranda's book "Algebraic curves and Riemann surfaces". We will probably be done at the end of the year, and we would like to continue the seminar. What would be the next best thing to study ?
The students are undergrad, so they know topology, algebra, complex analysis and multivariable calculus. We will also, roughly, be familiar with most of the book. (One of the students really wants to study sheaf theory, so something with some sheaf theory would be nice.) They don't know algebraic geometry (other than what is in Miranda).
I have some ideas of course, in particular "chapter on algebraic surfaces" by Miles Reid, and "Hodge theory and complex geometry I" by Claire Voisin. But that might be too hard just after Miranda, so I am interested in other propositions. If possible, avoid suggestions like reading Hartshorne (it's a lot of heavy machinery, and for example most of the applications of chapter 4 can be obtained by elementary methods over $\mathbb C$, like in Miranda's book.)
Miles Reid is a good idea. I also recommend Shafarevich's Basic Algebraic geometry - perhaps after already covering Miranda you might want to pick and choose the chapters you read.