Coursebooks

Integral equations methods for exterior problems

MATH-638

Lecturer(s) :

Buffa Annalisa

Language:

English

Frequency

Only this year

Remark

Postponed until further notice

Summary

I will introduce integral equation formulations for the Laplace, the wave equations and the electromagnetic scattering problem. The wellposedness and the discretization of these problems are discussed.

Content

- representation formulae for exterior problems for Laplace and wave equations

- integral equations formulation  and wellposedness

- discretization via Galerkin techniques

- the issue of integration

- Calderon identity and Calderon preconditioners

- Extension to electromagnetic wave propagation.

- Compression algorithms

 

Some of the courses will be organized as reading courses.

Note

Invited lecturer: Stefan SAUTER

In the programs

    • Semester
    • Exam form
       Oral presentation
    • Credits
      2
    • Subject examined
      Integral equations methods for exterior problems
    • Lecture
      16 Hour(s)
    • Practical work
      14 Hour(s)

Reference week

 
      Lecture
      Exercise, TP
      Project, other

legend

  • Autumn semester
  • Winter sessions
  • Spring semester
  • Summer sessions
  • Lecture in French
  • Lecture in English
  • Lecture in German