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Fourth-order multiple-relaxation-time lattice Boltzmann model and equivalent finite-difference scheme for one-dimensional convection-diffusion equations

Ying Chen, Zhenhua Chai, Baochang Shi

2023Physical review. E18 citationsDOI

Abstract

In this paper, we first develop a fourth-order multiple-relaxation-time lattice Boltzmann (MRT-LB) model for the one-dimensional convection-diffusion equation (CDE) with the constant velocity and diffusion coefficient, where the D1Q3 (three discrete velocities in one-dimensional space) lattice structure is used. We also perform the Chapman-Enskog analysis to recover the CDE from the MRT-LB model. Then an explicit four-level finite-difference (FLFD) scheme is derived from the developed MRT-LB model for the CDE. Through the Taylor expansion, the truncation error of the FLFD scheme is obtained, and at the diffusive scaling, the FLFD scheme can achieve the fourth-order accuracy in space. After that, we present a stability analysis and derive the same stability condition for the MRT-LB model and FLFD scheme. Finally, we perform some numerical experiments to test the MRT-LB model and FLFD scheme, and the numerical results show that they have a fourth-order convergence rate in space, which is consistent with our theoretical analysis.

Topics & Concepts

Lattice Boltzmann methodsMathematicsTruncation errorMathematical analysisBoltzmann equationScalingFinite differenceConvection–diffusion equationVon Neumann stability analysisStatistical physicsNumerical stabilityNumerical analysisPhysicsGeometryMechanicsQuantum mechanicsLattice Boltzmann Simulation StudiesAerosol Filtration and Electrostatic PrecipitationHeat and Mass Transfer in Porous Media
Fourth-order multiple-relaxation-time lattice Boltzmann model and equivalent finite-difference scheme for one-dimensional convection-diffusion equations | Litcius