Coarse-grained numerical bifurcation analysis of lattice Boltzmann models

The numerical stability of thermo-lattice Boltzmann (TLBE) models is presented. The TLBE algorithm is linearized and represented in matrix form. The spectral radius of the resulting matrix is obtained by the method of powers. In particular, the numerical stability of two 2-speed 13-bit TLBE models-o

## Abstract Many realistic protein‐engineering design problems extend beyond the computational limits of what is considered practical when applying all‐atom molecular‐dynamics simulation methods. Lattice models provide computationally robust alternatives, yet most are regarded as too simplistic to

A single-relaxation-time fluctuating lattice-Boltzmann (LB) model for direct numerical simulation (DNS) of particle Brownian motion is established by adding a fluctuating component to the lattice-Boltzmann equations (LBEs). The fluctuating term is proved to be the random stress tensor in fluctuating

A direct numerical simulation of a turbulent flow field with a lattice BGK method is presented. A spatial coarse graining of the numerical results is compared with the expected LBGK dynamics for a flow field on a reduced lattice size. This comparison permits to exhibit subgrid properties of the flui