I'm a PhD student in mathematics (mostly studying algebraic geometry), but I've always been interested in computational complexity theory.
As an undergraduate, I completed an independent reading course covering Arora-Barak's textbook on computational complexity, culminating the proof of the $\mathsf{PCP}$ theorem. It's been a little bit, but I remember really enjoying the sections on the polynomial hierarchy and interactive proofs (leading to a proof that $\mathsf{IP}=\mathsf{PSPACE}$).
I'd love to learn more about structural complexity theory, so (paraphrasing Wikipedia) the study of complexity classes themselves, rather than specific algorithms.
Are there any canonical references for this type of material? I'd also be really interested in learning more about what problems structural complexity theorists study today. (With a quick Google search, it seems like most articles that come up are from the 80's and 90's.)
Thank you for any help!