20213_math_525a

Real analysis / measure theory, taught by Prof. Ken Alexander.

• Course syllabus
• Lecture notes
• Homeworks. Disclaimer: a nontrivial portion of my solutions are flawed. Browse at your own risk. :)) 1 (preliminaries) ‖ 2 ($\sigma$-fields) ‖ 3 (measures) ‖ 4 (integrations) ‖ 5 (convergence theorems) ‖ 6 (convergence in measure) ‖ 7 (Fubini-Tonelli & measure decomposition) ‖ 8a (Lebesgue-Radon-Nikodym) ‖ 8b (absolute continuity) ‖ 9a (uhh whatever this is lol) ‖ 9b (functional analysis) ‖