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18.303 Linear Partial Differential Equations, Fall 2006

Matlab plot showing time evolution of a temperature distribution.
Time evolution of the temperature distribution u(x,t) on a semi-infinite rod whose end (at x=0) is kept at 0. Initially (t=0), the temperature of the rod is 1 between x=0.5 and x=1.5, and is zero everywhere else. (Image by Dr. Matthew Hancock.)

Highlights of this Course

This course features lecture notes and assignments.

Course Description

This course covers the classical partial differential equations of applied mathematics: diffusion, Laplace/Poisson, and wave equations. It also includes methods and tools for solving these PDEs, such as separation of variables, Fourier series and transforms, eigenvalue problems, and Green's functions.

Technical Requirements

Special software is required to use some of the files in this course: .m.

 

Staff

Instructor:
Dr. Matthew Hancock

Course Meeting Times

Lectures:
Two sessions / week
1.5 hours / session

Level

Undergraduate

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