I'm a senior in my undergrad. years of college, and I haven't taken Complex Analysis yet.
I have taken Real Analysis I (covered properties of $\mathbb{R}$, set theory, limits of sequences and functions, series, (uniform) continuity, uniform convergence) and Abstract Algebra I (covered $\mathbb{Z}_{n}$, an intro to group theory (groups, subgroups, quotient groups, isomorphism theorems, semidirect products), and an intro to ring theory (fields, ideals)).
The book that we use at the university I attend isn't very analytical, from my understanding. (The book is Fundamentals of Complex Analysis with Applications to Engineering, Science, and Mathematics, 3rd ed. by Saff.) Of the courses I've taken in my undergrad, Real Analysis I has definitely been my favorite course so far, and I will be taking Real Analysis II (covers integration and differentiation in $\mathbb{R}^n$, Riemman-Stieltjes, and some other topics that I don't know about) this upcoming fall.
Are there any books on complex analysis that you would suggest given my background? Thank you!
Edit: Other courses I have taken: I have taken Calculus I through III (nothing on Differential Equations - although I do know what a first-order linear differential equation is), actuarial science courses (Probability (Calculus-based), Statistics (Calculus-based), Life Contingencies), and Linear Algebra (one semester using Larson's Elementary Linear Algebra and a second semester independent study using Axler).
