Simulation Of Shock-Wave Propagation With Finite Volume Lattice Boltzmann Method

A new approach was recently proposed to construct equilibrium distribution functions$(f^{eq}_{\alpha})$of the lattice Boltzmann method for simulation of compressible flows. In this approach, the Maxwellian function is replaced by a simple function which satisfies all needed relations to recover compressible Euler equations. With Lagrangian interpolation polynomials, the simple function is discretized onto a fixed velocity pattern to construct$f^{eq}_{\alpha}$. In this paper, the finite volume method is combined with the new lattice Boltzmann models to simulate 1D and 2D shock-wave propagation. The numerical results agree well with available data in the literatures.