Digital Teaching
This course will be held in person, if possible. Additional material will be provided via moodle.
Lehrinhalte
The lecture focuses on the numerical solution of common problems/equations in theoretical physics.
During the course of the lecture, the following topics will be studied:
[list]
[*]Anharmonic oscillator (numerical treatment of matrices)
[*]Fixed points and phase transitions (solving non-linear equations)
[*]Ising model (interpolation, numerical integration, monte carlo simulations)
[*]Partial differential equations (Finite Difference, Finite Element, Finite Volume and Discontinuous Galerkin discretizations, combined with several examples from hydrodynamics, electrodynamics and quantum mechanics)
[/list]
Literature
Will be announced in the lecture.
Voraussetzungen
No requirements for participation.
Partially builds upon the lecture "Computational Physics".
Zusätzliche Informationen
No requriements regarding the programming language for exercises. Recommended choices: Python, C , Julia
Online-Angebote
Moodle
This course will be held in person, if possible. Additional material will be provided via moodle.
Lehrinhalte
The lecture focuses on the numerical solution of common problems/equations in theoretical physics.
During the course of the lecture, the following topics will be studied:
[list]
[*]Anharmonic oscillator (numerical treatment of matrices)
[*]Fixed points and phase transitions (solving non-linear equations)
[*]Ising model (interpolation, numerical integration, monte carlo simulations)
[*]Partial differential equations (Finite Difference, Finite Element, Finite Volume and Discontinuous Galerkin discretizations, combined with several examples from hydrodynamics, electrodynamics and quantum mechanics)
[/list]
Literature
Will be announced in the lecture.
Voraussetzungen
No requirements for participation.
Partially builds upon the lecture "Computational Physics".
Zusätzliche Informationen
No requriements regarding the programming language for exercises. Recommended choices: Python, C , Julia
Online-Angebote
Moodle
- Lehrende: (TU-ID gelöscht)Gelöschter User
Semester: ST 2022