20203_math_425a

Note: I started using my current (as of 2022) LaTeX template (color themes, fonts, and so on) after this semester, so everything in this page will look different from most other pages. Same with taking lecture notes systematically. I did take notes in fall 2022, but I did not try to merge the files into a big one.

Personally, I strongly prefer my current LaTeX setup than this one. YMMY though.

Fundamental concepts of analysis, taught by Prof. Kyler Siegel. It is no exaggeration to say my entire college career is shaped by this one class. I simple love the content. Period.

• Lecture notes & exams: I wrote some [150-page 425a notes] the following summer for pure enjoyment. Consider checking that out.
• Homeworks. Disclaimer: a nontrivial portion of my solutions are flawed. Browse at your own risk. :)) 1 (sets) ‖ 2 (Dedekind cuts) ‖ 3 (suprema & infima) ‖ 4 (cardinalities, injections, & surjections) ‖ 5 (metric spaces) ‖ 6 (continuity) ‖ 7 (open sets & closed sets) ‖ 8 (compact sets & connected sets) ‖ 9 (dense sets & the Cantor set) ‖ 10 (differentiable functions) ‖ 11 (Riemann integrability)