Partial Differential Equations

Vrije Universiteit Amsterdam

Course Description

  • Course Name

    Partial Differential Equations

  • Host University

    Vrije Universiteit Amsterdam

  • Location

    Amsterdam, The Netherlands

  • Area of Study

    Calculus, Physics

  • Language Level

    Taught In English

  • Course Level Recommendations


    ISA offers course level recommendations in an effort to facilitate the determination of course levels by credential evaluators.We advice each institution to have their own credentials evaluator make the final decision regrading course levels.

    Hours & Credits

  • ECTS Credits

  • Recommended U.S. Semester Credits
  • Recommended U.S. Quarter Units
  • Overview

    The majority of physical phenomena can be described by partial differential equations. This module discusses these equations and methods for their solution. For first order equations we discuss the method of characteristics and the solution by methods of ordinary differential equations. For second order equations, in particular for the heat and wave equation we discuss the method of separation of variables. This ties in with the remarkable result of Fourier that almost any periodic function can be represented as a sum of sines and cosines, called its Fourier series. An analogous representation for non- periodic functions is provided by the Fourier transform, to be discussed briefly in part 2, as well as some theoretical background for Fourier series. In Part 2 we discuss some of the background for generalised Fourier series: the role of eigenvalue problems and some basic spectral theory. Potential methods and fundamental solutions will be discussed for the standard examples: heat, wave and Poisson equation. Harmonic functions will be discussed in relation to mean value properties.

    Part 1: - Classical examples - First order equations and characteristics - d'Alembert's solution for the wave equation - Separation of variables for second order equations - Fourier Series - Fundamental solutions for heat and wave equation in one spatial dimension - The Dirac delta- function.

    Part 2 - Fourier theory - Laplace and Poisson equation through potential methods - Eigenvalue problems and some spectral theory - Special functions (Bessel functions) - Harmonic functions - Fundamental solutions in 2 and 3 spatial dimensions

    Course and exercise class

    Two written exams and incidental homework

    Calculus, in particular vectorcalculus, Gauss divergence Theorem and Green's formulas

Course Disclaimer

Courses and course hours of instruction are subject to change.

Some courses may require additional fees.


This site uses cookies to store information on your computer. Some are essential to make our site work; others help us improve the user experience. By using the site, you consent to the placement of these cookies.

Read our Privacy Policy to learn more.