Seminar Lattice Boltzmann Methods - Theory, Implementation and Applications-WS15
- Term
- Winter 15
- Lecturer
- Dr. rer. nat. Philipp Neumann, Nikola Tchipev, M.Sc., Arash Bakhtiari, M.Sc. (hons)
- Time and Place
- Preliminary meeting: Thursday, July 2, 14:00, room 02.07.023
- Kickoff: t.b.a.
- Presentations: t.b.a.
- Audience
- Students from Master Computational Science and Engineering (IN2183), Informatics (IN2107), and Bachelor Informatics (IN0014)
- Tutorials
- -
- Exam
- -
- Semesterwochenstunden / ECTS Credits
- 2 SWS (2S) / 4 Credits
- TUMonline
- t.b.a.
Contents
News
- Aug 20: The presentations have now been assigned. Please check out the updated information in the slides of the preliminary session (Jul 2) below.
- Aug 20: Topic descriptions are now also available, see information of preliminary session (Jul 2) below.
- Max. number of participants: 19
- The seminar will be completely in English, so the students also have to give their talks and to write their papers in English.
Description
Lattice Boltzmann methods (LBMs) are used to study flow problems on the statistical scale. Their relatively simple, (mostly) local algorithmics and their meso-scale nature make these methods attractive for both physicists and computer scientists. The latter is particularly true with respect to the field of high performance computing. In this seminar, the basic theory of the Lattice Boltzmann methods is discussed and implementational concepts are presented for single-core and multi-core architectures. Besides, particular aspects such as grid refinement and application of LBMs to more complex systems such as multiphase flows are addressed.
Slides and Handouts
The handouts will be printed for you. If you want to have a closer look into the material beforehand, you are welcome to use the electronic versions from below.
Date | Description | Material |
Jul 2 | Preliminary meeting | Introduction to seminar Slides, Topic descriptions |
Nov 5 | Introduction to CFD | Paper, Slides |
Nov 5 | Introduction to LBM | Paper, Slides, cavity.m |
Nov 5 | Boundary conditions | Paper, Slides |
Dec 10 | Single-core optimization | Paper, Slides, Source code |
Dec 10 | From the Boltzmann equation to LBM | Paper, Slides |
Jan 14 | Free surface flows | Paper, Slides |
Jan 14 | LBM for blood flow simulations | Paper, Slides |
Jan 21 | Parallelisation of LBM | Paper, Java Code, Slides |
Jan 21 | LBM on GPUs | Paper |
Prerequisites
Preliminary knowledge on
- Cellular automata
- Lattice Boltzmann equation
- Computational fluid dynamics
- Numerical simulation
is helpful.
Topics
- Introduction to LBM
- Boundary Conditions in LBM simulations
- Single-core optimisation of LBm
- From the Boltzmann equation to LBM
- From LBM to Navier-Stokes
- Multiple-relaxation-time Collision Models
- LBM on adaptive grids
- Open Source LBM software
- Entropic LB schemes
- Fluctuating hydrodynamics
- LBM for rarefied gas flows
- Simulation of colloidal suspensions
- Free surface flows
- LBM on GPUs
- (Distributed memory) Parallelisation of LBM
- LBM for Multiphase/ multicomponent flows
- LBM for shallow water flows
- Coupling LBM and Navier-Stokes
- LBM for blood flows
Left : Interactive fluid simulation (based on Lattice Boltzmann method) and visualization (volume tracing, photon mapping). Right: Breaking dam simulation.
Literature
Textbooks on LBM:
- S. Succi, The Lattice Boltzmann Equation for Fluid Dynamics and Beyond, Oxford University Press, 2001.
- M.C. Sukop and D.T. Thorne, Lattice Boltzmann Modeling: An Introduction for Geoscientists and Engineers, Springer, 2006.
- D.A. Wolf-Gladrow, Lattice-Gas Cellular Automata and Lattice Boltzmann Models: An Introduction, Springer, 2000
Topic-specific literature will be handed out to the individual participants of the course by the advisors.
Requirements
For successful completion of the seminar course you have to fulfil the following tasks:
- solid understanding of your topic (e.g. by implementation of the underlying algorithm)
- writing of a paper (about 8 pages)
- presentation (30 min + discussion)
- participation in the presentations of all other participants
- deadlines: t.b.a.
The paper template is available here. Usage of Latex is required.