Meetings: Tuesdays 5:00-6:00pm EST via Zoom
Textbooks/references:

• Primary reference - the notes posted by the course instructor on Quercus.
• W. Strauss, Partial Differential Equations: An Introduction, 2nd edition, Wiley
• R. Choksi, Partial Differential Equations: A First Course, AMS 2022

Tutorials

Here you will find information on what I covered in the tutorials. If a tutorial appears hyperlinked (blue), you can click it to find the typed notes. If you happen to find any errors, please feel free to contact me.

• Tutorial 1 - 5/16/2023: Introduction, wave equation via separation of variables examples
• Tutorial 2 - 5/23/2023
• Tutorial 3 - 5/30/2023
• Tutorial 4 - 6/6/2023
• Tutorial 5 - 6/13/2023
• Tutorial 6 - 7/4/2023
• Tutorial 7 - 7/11/2023
• Tutorial 8 - 7/18/2023
• Tutorial 9 - 7/25/2023
• Tutorial 10 - 8/1/2023: Duhamel’s Principle - heat equation, transport equation. Typed notes generously provided by Youssef Rachad can be found here.
• Tutorial 11 - 8/8/2023: Fourier Transform, convolution, solve DE with transform.
• Tutorial 12 - 8/17/2023: Bonus review session for the final exam.