Mathematics 231: Ordinary Differential Equations

Mathematics 231: Ordinary Differential Equations (Fall 2005)

Instructor:

Description:

Theory for existence (local and global), uniqueness, and continuous dependence on parameters. Linear equations with constant or periodic coefficients. Stability of equilibria and periodic orbits. Bifurcation theory: local (steady state and Hopf) and global (homoclinic). An example of chaos (the Lorenz attractor).

This course is normally taken by all first year graduate students in mathematics. Students outside of Mathematics are welcome. The format of the course makes it fairly easy to accomodate a variety of backgrounds. Please see the instructor if you are concerned whether your background will be sufficient for the course.

Prerequisites:

Math 103 (Multiple-variable calculus), Math 104 (Linear algebra), and Math 139 (Analysis) and undergraduate ordinary differential equations (Math 108, 111 or 131).

Text:

Differential equations, dynamical systems, and an introduction to chaos by Hirsch, Smale, and Devaney

Course Website:

For more information see Professor Schaeffer.

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Last modified: 27 March 2002