On the finite-element-based lattice Boltzmann scheme

Standard

On the finite-element-based lattice Boltzmann scheme. / Krivovichev, G. V.

в: Applied Mathematical Sciences, Том 8, № 33-36, 2014, стр. 1605-1620.

Результаты исследований: Научные публикации в периодических изданиях › статья › Рецензирование

Author

Krivovichev, G. V. / On the finite-element-based lattice Boltzmann scheme. в: Applied Mathematical Sciences. 2014 ; Том 8, № 33-36. стр. 1605-1620.

BibTeX

@article{ba8607b32c8e457989e0d4dd69b4fade,

title = "On the finite-element-based lattice Boltzmann scheme",

abstract = "The finite-element-based lattice Boltzmann scheme for the computations on unstructured meshes is proposed. The scheme is based on the weighted residuals method with Galerkin approximation. The scheme is reduced to the solution of the linear algebraic system at every time step. The possibilities of application of the developed scheme for practical problems are demonstrated on the applications to two test problems of computational fluid dynamics. The investigation of the equilibrium boundary conditions for distribution functions is performed. The obtained results demonstrate that this type of boundary conditions can produced a results which are in good agreement with the results obtained from the solution of hydrodynamical equations at Re ≥ 20. The algorithm of the proposed scheme is realized in GNU license software freefem++ v.3.20.",

keywords = "Finite element method, Freefem++, Lattice Boltzmann method",

author = "Krivovichev, {G. V.}",

note = "Publisher Copyright: {\textcopyright} 2014 G. V. Krivovichev.",

year = "2014",

doi = "10.12988/ams.2014.4138",

language = "English",

volume = "8",

pages = "1605--1620",

journal = "Applied Mathematical Sciences",

issn = "1312-885X",

publisher = "Hikari Ltd.",

number = "33-36",

}

RIS

TY - JOUR

T1 - On the finite-element-based lattice Boltzmann scheme

AU - Krivovichev, G. V.

PY - 2014

Y1 - 2014

N2 - The finite-element-based lattice Boltzmann scheme for the computations on unstructured meshes is proposed. The scheme is based on the weighted residuals method with Galerkin approximation. The scheme is reduced to the solution of the linear algebraic system at every time step. The possibilities of application of the developed scheme for practical problems are demonstrated on the applications to two test problems of computational fluid dynamics. The investigation of the equilibrium boundary conditions for distribution functions is performed. The obtained results demonstrate that this type of boundary conditions can produced a results which are in good agreement with the results obtained from the solution of hydrodynamical equations at Re ≥ 20. The algorithm of the proposed scheme is realized in GNU license software freefem++ v.3.20.

AB - The finite-element-based lattice Boltzmann scheme for the computations on unstructured meshes is proposed. The scheme is based on the weighted residuals method with Galerkin approximation. The scheme is reduced to the solution of the linear algebraic system at every time step. The possibilities of application of the developed scheme for practical problems are demonstrated on the applications to two test problems of computational fluid dynamics. The investigation of the equilibrium boundary conditions for distribution functions is performed. The obtained results demonstrate that this type of boundary conditions can produced a results which are in good agreement with the results obtained from the solution of hydrodynamical equations at Re ≥ 20. The algorithm of the proposed scheme is realized in GNU license software freefem++ v.3.20.

KW - Finite element method

KW - Freefem++

KW - Lattice Boltzmann method

UR - http://www.scopus.com/inward/record.url?scp=84898849757&partnerID=8YFLogxK

U2 - 10.12988/ams.2014.4138

DO - 10.12988/ams.2014.4138

M3 - Article

VL - 8

SP - 1605

EP - 1620

JO - Applied Mathematical Sciences

JF - Applied Mathematical Sciences

SN - 1312-885X

IS - 33-36

ER -

ID: 6999020

Standard

Harvard

APA

Vancouver

Author

BibTeX

RIS