Entropic multirelaxation-time lattice Boltzmann method for moving and deforming geometries in three dimensions

摘要

Entropic lattice Boltzmann methods have been developed to alleviate intrinsic stability issues of lattice Boltzmann models for under-resolved simulations. Its reliability in combination with moving objects was established for various laminar benchmark flows in two dimensions in our previous work [B. Dorschner, S. Chikatamarla, F. B?sch, and I. Karlin, J. Comput. Phys. 295, 340 (2015)] as well as for three-dimensional one-way coupled simulations of engine-type geometries in B. Dorschner, F. B?sch, S. Chikatamarla, K. Boulouchos, and I. Karlin [J. FluidMech. 801, 623 (2016)] for flat moving walls. The present contribution aims to fully exploit the advantages of entropic lattice Boltzmann models in terms of stability and accuracy and extends the methodology to three-dimensional cases, including two-way coupling between fluid and structure and then turbulence and deforming geometries. To cover this wide range of applications, the classical benchmark of a sedimenting sphere is chosen first to validate the general two-way coupling algorithm. Increasing the complexity, we subsequently consider the simulation of a plunging SD7003 airfoil in the transitional regime at a Reynolds number of Re = 40 000 and, finally, to access the model’s performance for deforming geometries, we conduct a two-way coupled simulation of a self-propelled anguilliform swimmer. These simulations confirm the viability of the new fluid-structure interaction lattice Boltzmann algorithm to simulate flows of engineering relevance.