Bibliographic Details
| Title: |
Lattice Boltzmann for linear elastodynamics: periodic problems and Dirichlet boundary conditions |
| Authors: |
Boolakee, Oliver, Geier, Martin, De Lorenzis, Laura |
| Publication Year: |
2024 |
| Collection: |
Computer Science
Mathematics |
| Subject Terms: |
Mathematics - Numerical Analysis |
| More Details: |
We propose a new second-order accurate lattice Boltzmann formulation for linear elastodynamics that is stable for arbitrary combinations of material parameters under a CFL-like condition. The construction of the numerical scheme uses an equivalent first-order hyperbolic system of equations as an intermediate step, for which a vectorial lattice Boltzmann formulation is introduced. The only difference to conventional lattice Boltzmann formulations is the usage of vector-valued populations, so that all computational benefits of the algorithm are preserved. Using the asymptotic expansion technique and the notion of pre-stability structures we further establish second-order consistency as well as analytical stability estimates. Lastly, we introduce a second-order consistent initialization of the populations as well as a boundary formulation for Dirichlet boundary conditions on 2D rectangular domains. All theoretical derivations are numerically verified by convergence studies using manufactured solutions and long-term stability tests. |
| Document Type: |
Working Paper |
| DOI: |
10.1016/j.cma.2024.117469 |
| Access URL: |
http://arxiv.org/abs/2408.01081 |
| Accession Number: |
edsarx.2408.01081 |
| Database: |
arXiv |
