I'm looking for books which contain a more or less self-contained description of how elliptic curves over $\mathbb{C}$ - that is, nonsingular plane cubic curves - can be realized as a quotient of the complex plane by some lattice.
I'm currently trying to get into Husemollers book on elliptic curves, but it is not detailed enough for my skill set and I like to have several sources at hand. Lecture notes are of course also welcome (I do have some background in complex analysis, but only up to the very basics of elliptic functions). Thanks!