SoSe 23: Numerical Methods for Fluid Flows
Dirk Peschka
Comments
The solution of partial differential equations (PDEs) related to flow phenomena is of great importance in a variety of application areas such as physics and engineering. However, the use of numerical methods to solve these equations often presents significant challenges. These include, for example, the need to discretize the problem, the choice of appropriate boundary conditions, and the computational cost of the simulation.
This seminar-style course is intended for students who have prior knowledge of discretizing PDEs using finite element or finite difference methods. The goal of the course is to provide an introduction to these techniques and their applications in fluid dynamics. The course covers a wide range of models and methods in fluid dynamics, including those related to laminar and turbulent flows, multiphase and interfacial flows.
Overall, the course aims to equip students with the skills and knowledge required to tackle challenging problems in fluid dynamics using numerical methods. Students will work on projects that will be presented at the end of the semester.
close14 Class schedule
Regular appointments