This page will contain some information about the Fall 2010/2011 APM384 course on Partial Differential Equations.

Course official website on the Blackboard:

https://portal.utoronto.ca/

Course outline:

This is a short half year introductory course in partial differential equations for engineering science students. Differential equations are of basic importance in engineering mathematics because many physical laws and relations appear mathematically in the form of differential equations. The course will focus on the classical partial differential equations of mathematical physics: the wave equation, the diffusion equation and Laplace’s equation with some variations. We will develop important techniques of finding general solutions for the classical PDEs in explicit form. When an explicit form of the solution is unavailable we will apply qualitative analysis to study existence, uniqueness, and stability of the solutions of the equations.

Instructor for APM384H1:

Marina Chugunova, HU 1025, (416) 946-3769, chugunom@math.utoronto.ca
Lectures: Monday (10:00 – 12:00) SF3202, Wednesday (11:00 – 12:00) BA1180
Office hours: Monday (16:00 – 18:00) HU 1025
(elevators do not take you on the 10th floor please go upstairs)

Teaching assistant:

John Collett: office: BA6135, 416-978-4794, collett.jd@gmail.com
Office hours: supervision of APM384 Forum.
Tutorials: TUT 01     Wed   10:00 – 11:00     GB404
TUT 02     Tue     17:00 – 18:00     WB219

Format:

The lectures form the essential content of the course, and you are responsible for all material covered in lectures (unless otherwise indicated.) Most of the material can be found in the textbook, but the lectures may deviate from the book in content or ordering of material. If you miss a lecture, it is your responsibility to find out (from a classmate) what has been covered in your absence. A table containing the titles of the topics covered (and a reference to the textbook if appropriate) in each previous lecture will be posted on the Blackboard portal.

Textbook:

Partial Differential Equations: An Introduction“, by Walter A. Strauss, John Wiley & Sons (publishers); [second edition]

The text is viewed as a learning resource for the students, a supplement to the lectures), and a source of homework and practice problems. You are strongly recommended to obtain a copy of the book or to make systematic use of a borrowed copy.

Topics:

We will cover the starred sections, with supplemental material provided in the lectures. After that, if time permits, we will cover selected topics from Chapters 8, 11, 14

Homework:

Exercises from the Strauss textbook will be assigned weekly with some exceptions. The homework will be due on Mondays at the beginning of class.

Marking Scheme:

There will be two tests and a final exam. The tests will occur in mid-October and mid-November and time will be scheduled for the final exam. The final grade will be determined by the scale:
15% Test 1, 25% Test 2, 50% Final exam, and 10% Homework
( To resolve dog-ate-my-homework-like situations only 9 the best homeworks out of 10 will be counted. )

Note:

If you miss a test, an exam or homework due date due to illness or other emergency, you must obtain a medical certificate from Student Health Services or a doctor. For more information please consult the document: http://www.utoronto.ca/health/forms/forms.htm

Warning!:

Be aware of the University policies on Academic Dishonesty: You are expected to exhibit honesty and use ethical behaviour in all aspects of the learning process. Academic credentials you earn are rooted in principles of honesty and academic integrity. Academic dishonesty is to knowingly act or fail to act in a way that results or could result in unearned academic credit or advantage. This behaviour can result in serious consequences, e.g. the grade of zero on an assignment, loss of credit with a notation on the transcript (notation reads: “Grade of F assigned for academic dishonesty”), and/or suspension or expulsion from the university. It is your responsibility to understand what constitutes academic dishonesty. For information on the various types of academic dishonesty please refer to the Academic Integrity Policy, located at:
http://www.utoronto.ca/academicintegrity