2020
DOI: 10.1098/rsta.2019.0397
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Impact of collision models on the physical properties and the stability of lattice Boltzmann methods

Abstract: The lattice Boltzmann method (LBM) is known to suffer from stability issues when the collision model relies on the BGK approximation, especially in the zero viscosity limit and for non-vanishing Mach numbers. To tackle this problem, two kinds of solutions were proposed in the literature. They consist in changing either the numerical discretization (finite-volume, finite-difference, spectral-element, etc.) of the discrete velocity Boltzmann equation (DVBE), or the collision model. In this work, the latter solut… Show more

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Cited by 56 publications
(55 citation statements)
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References 124 publications
(219 reference statements)
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“…A crucial importance is therefore attributed to the explicit calculation of the equilibrium term, as a function of the macroscopic variables density, velocity and temperature. As a matter of fact, the expression of the equilibrium distribution can be considered to entirely determine the physics expressed by the model [94,95], if and only if the different non-equilibrium contributions are relaxed to recover the correct transport coefficients of the macroscopic equations of interest (see [96] for a systematic approach in the context of fluid mechanics).…”
Section: Implementation and Efficiencymentioning
confidence: 99%
“…A crucial importance is therefore attributed to the explicit calculation of the equilibrium term, as a function of the macroscopic variables density, velocity and temperature. As a matter of fact, the expression of the equilibrium distribution can be considered to entirely determine the physics expressed by the model [94,95], if and only if the different non-equilibrium contributions are relaxed to recover the correct transport coefficients of the macroscopic equations of interest (see [96] for a systematic approach in the context of fluid mechanics).…”
Section: Implementation and Efficiencymentioning
confidence: 99%
“…We will call Eq. (4) the cumulant SRT equation or KSRT (where we use 'K' for cumulants [20,53] due to the fact that 'C' has been established for central moments in the lattice Boltzmann context and because cumulant is written with 'K' in many European languages). Further, we denote the BGK operator with the same equilibrium as the cumulant operator as BGK+ in order to distinguish it from the standard lattice BGK model which uses a Taylor expanded Maxwellian as equilibrium.…”
Section: Differences Between the Cumulant Model And Other Lattice Bolmentioning
confidence: 99%
“…The idea is always that the collision operator is not applied to the distributions directly but to some sort of moments such that different relaxation parameters can be attached to different observable quantities. While the original multiple relaxation time models used unweighted orthogonal raw moments [14][15][16], a wide range of other options have now been promoted, including central moments [17][18][19], Hermite moments [20] and cumulants [21]. Besides these complete transformations there exist methods separating hydrodynamic relevant information from so-called ghost modes using only a small set of categories (two or three).…”
Section: Introductionmentioning
confidence: 99%
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“…For the Hermite polynomial formulations, one obtains the upper limit Ma max = √ 3 − 1 ≈ 0.73, with Ma max obtained by considering all possible orientations of the mean flow and keeping the minimal value. Interestingly, one cannot increase this critical Mach number by changing the collision model [43,79] or the numerical scheme [80]. In fact, this can only be achieved by modifying the velocity discretization and the equilibrium state [9,16,43].…”
Section: B Linear Stability Domainmentioning
confidence: 99%