| Instructor: | Dr. Peter Howard, Blocker 625B |
| Email: phoward@math.tamu.edu |
Office hours: TWR 1:30-2:30. Also, by appointment.
Class
times and place: MWF 11:30-12:20, Blocker 202.
Section
web page: /~phoward/M611.html
Textbook:
Partial Differential
Equations, 2nd Edition, by Lawrence C. Evans, Graduate Studies
in Mathematics vol. 19 (2010), American Mathematics Society.
Prerequisites:
The only listed prerequisite is a year of advanced calculus (often
called real analysis or real variables), listed as M409-410 in the
Texas A&M course catalog.
Catalog Description: Basic theory of ordinary differential equations; existence and uniqueness, dependence on parameters, phase portraits, vector fields. Partial differential equations of first order, method of characteristics. Basic linear partial differential equations: Laplace equation, heat (diffusion) equation, wave equation and transport equation. Solution techniques and qualitative properties.
Homework
Assignments:
A homework
assignment will
be made both in class and on the course web site each Friday, and will
be due the following Friday. Homework assignments will typically
consist of four problems, worth ten points each. Work will be
accepted up to a week late, though five points will be
deducted
for each class period by which the assignment is late.
Exams: There
will be two exams, a midterm and a final. The midterm exam
will be
in the evening, 7:00-9:00 p.m., Wednesday Oct. 29. The final exam for
this class will be on Wednesday, Dec. 17, 10:30 a.m.-12:30 p.m. Please make a
note of
these dates.
Grades: Final grades will be determined in the following manner: Homework assignments: 50%; Exams: 25% each. Grade ranges will be graduate standard: 89.50-100, A; 79.50-89.49, B; 69.50-79.49, C, 59.50-69.49, D; below 59.50, F.
Learning outcomes: Students will be able to: find exact solutions to linear ODE systems with constant coefficients; identify conditions under which nonlinear ODE systems have unique solutions that depend continuously on parameters and initial data; find exact solutions to special cases of Laplace's equation and understand qualitative properties of solutions to Laplace's equation as characterized by the Maximum Principle, Liouville's Theorem, and Harnack's inequality; find exact solutions to special cases of the heat equation and understand qualitative properties of solutions to the heat equation as characterized by the parabolic mean value formula and Maximum Principle; find exact solutions to special cases of the wave equation and understand qualitative properties of solutions to the wave equation; solve first order quasilinear and nonlinear equations with the method of characteristics; find exact solutions to special cases of the Hamilton-Jacobi equation via the Hopf-Lax formula.
Make-up policy: Make-ups for exams will only be given if the student can provide a documented University-approved excuse (see University Regulations). According to University Student Rules students are required to notify an instructor by the end of the next working day after missing an exam. Otherwise the student forfeits his or her right to a make-up.
Scholastic Dishonesty: Copying work done by others, either in-class or out of class, is an act of scholastic dishonesty and will be prosecuted to the full extent allowed by University policy. "An Aggie does not lie, cheat, or steal or tolerate those who do." Please refer to the Honor Council Rules and Procedures, available at the Office of the Aggie Honor System.
Copyright policy: All printed materials disseminated in class or on the web are protected by copyright laws. One xerox copy (or download from the web) is allowed for personal use. Multiple copies or sale of any of these materials is strictly prohibited.
Students with Disabilities: The following statement was provided by the Department of Disability Services: The Americans with Disabilities Act (ADA) is a federal anti-discrimination statute that provides comprehensive civil rights protection for persons with disabilities. Among other things, this legislation requires that all students with disabilities be guaranteed a learning environment that provides for reasonable accommodation of their disabilities. If you believe you have a disability requiring an accommodation, please contact Disability Services, in Cain Hall, Room B118, or call 845-1637. For additional information visit http://disability.tamu.edu.
Class
Schedule: Roughly speaking, we should cover the following
material on the following schedule:
Make-up policy: Make-ups for exams will only be given if the student can provide a documented University-approved excuse (see University Regulations). According to University Student Rules students are required to notify an instructor by the end of the next working day after missing an exam. Otherwise the student forfeits his or her right to a make-up.
Scholastic
Dishonesty: Copying work done by
others, either
in-class
or out of class, is an act of scholastic dishonesty and will be
prosecuted
to the full extent allowed by University policy. "An Aggie does not
lie, cheat, or steal or tolerate those who do." Please refer to the
Honor Council Rules and Procedures, available at the Office of the Aggie
Honor System.
Copyright policy: All printed materials disseminated in class or on the web are protected by copyright laws. One xerox copy (or download from the web) is allowed for personal use. Multiple copies or sale of any of these materials is strictly prohibited.
Students
with Disabilities: The following
statement was
provided by the Department of Student Life: The Americans with
Disabilities Act (ADA) is a federal anti-discrimination statute that
provides comprehensive civil rights protection for persons with
disabilities. Among other things, this legislation requires that all
students with disabilities be guaranteed a learning environment that
provides for reasonable accomodation of their disabilities.
If
you believe you have a disability requiring an accomodation, please
contact the Department of Student Life, Services
for Students with Disabilities (SSD),
in Cain Hall, Room B118 or call 845-1637.
Class Schedule: Roughly speaking, we should cover the following material on the following schedule:
| Week of Monday | Material Covered |
|---|---|
| August 25 |
Introduction to the analysis of ODE (Fri. Aug. 29 is
last day for
drop/add). |
| September 1 |
ODE existence, uniqueness, stability. |
| September 8 |
Measure theory, Lebesgue spaces, approximation, multivariate
integration and differentiation. |
| September 15 |
Introduction to the analysis of PDE. |
| September 22 |
Laplace Equation I. Fundamental solution, properties of
harmonic functions. |
| September 29 |
Laplace Equation II. Green's functions. |
| October 6 |
Distribution Theory. |
| October 13 |
Heat Equation I. Fundamental solution, mean value
property. |
| October 20 |
Heat Equation II. Regularity, local estimates, energy methods. (Midterm Wed. Oct. 22) |
| October 27 |
Wave Equation. D'alembert's solutions, spherical
means (Fri. Oct. 31 is
last day for
Q-drop). |
| November 3 |
Method of Characteristics. |
| November 10 |
Hamilton-Jacobi equations. |
| November 17 |
Conservation Laws. (Tuesday, Nov. 18 is Bonfire 1999 Rememberance Day.) |
| November 24 |
Similarity solutions. (Thanksgiving holiday,
Nov. 27-28.) |
| December 1 |
Transform Methods. (Tuesday,
Dec. 2 is the last day of class, redefined as Thursday) |