MATH 717: Applied
Dynamical Systems (Spring 2004)
Instructor:
John Guckenheimer
Meeting
Time & Room
Nonlinear dynamical systems are used as models in every
field of science and engineering. Universal patterns of behavior, including
"chaos," have been observed in large sets of examples. Mathematical
theories describing geometrically the qualitative behavior of "generic"
systems explain many of these patterns. This course will discuss both
the theory and its application to examples. Several representative examples
from the life sciences and other disciplines will be described at the
beginning of the course and used throughout the semester to illustrate
theoretical ideas. Emphasis will be placed upon bifurcation, the qualitative
changes in solutions that occur as system parameters are varied. Computational
methods for the analysis of dynamical systems will also be discussed.
The performance of algorithms and their mathematical foundations will
be considered. Further development of these computational methods is an
active research area, and the course lectures will repeatedly deal with
this frontier. Computer laboratory sessions will be held in addition to
lectures. Student projects will be required for completion of the course.
Last modified:
October 23, 2003
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