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An introduction to the Lattice Boltzmann method :a numerical method for complex boundary and moving boundary flows /

Record Type:	Language materials, printed : Monograph/item
Title/Author:	An introduction to the Lattice Boltzmann method :Takaji Inamuro, Kyoto University, Japan, Masato Yoshino, Shinshu University, Japan, Kosuke Suzuki, Shinshu University, Japan.
Reminder of title:	a numerical method for complex boundary and moving boundary flows /
Author:	Inamuro, Takaji,
other author:	Yoshino, Masato,
Description:	xi, 153 pages :illustrations ;24 cm
Subject:	Viscous flowMathematical models.
ISBN:	9789811240515

An introduction to the Lattice Boltzmann method :a numerical method for complex boundary and moving boundary flows /
Inamuro, Takaji,

An introduction to the Lattice Boltzmann method :a numerical method for complex boundary and moving boundary flows /Takaji Inamuro, Kyoto University, Japan, Masato Yoshino, Shinshu University, Japan, Kosuke Suzuki, Shinshu University, Japan. - xi, 153 pages :illustrations ;24 cm

Includes bibliographical references (pages 141-150) and index.

"The book introduces the fundamentals and applications of the lattice Boltzmann method (LBM) for incompressible viscous flows. It is written clearly and easy to understand for graduate students and researchers. The book is organized as follows. In Chapter 1, the SRT- and MRT-LBM schemes are derived from the discrete Boltzmann equation for lattice gases and the relation between the LBM and the Navier-Stokes equation is explained by using the asymptotic expansion (not the Chapman-Enskog expansion). Chapter 2 presents the lattice kinetic scheme (LKS) which is an extension method of the LBM and can save memory because of needlessness for storing the velocity distribution functions. In addition, an improved LKS which can stably simulate high Reynolds number flows is presented. In Chapter 3, the LBM combined with the immersed boundary method (IB-LBM) is presented. The IB-LBM is well suitable for moving boundary flows. In Chapter 4, the two-phase LBM is explained from the point of view of the difficulty in computing two-phase flows with large density ratio. Then, a two-phase LBM for large density ratios is presented. In Appendix, sample codes (available for download) are given for users"--

ISBN: 9789811240515

LCCN: 2021050556Subjects--Topical Terms:

722536
Viscous flow
--Mathematical models.

LC Class. No.: TA357.5.V56 / I43 2022

Dewey Class. No.: 620.1/064

An introduction to the Lattice Boltzmann method :a numerical method for complex boundary and moving boundary flows /
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020 $a 9789811240515 $q (hardcover)
020 $a 9811240515
020 $z 9789811240522 $q (ebook for institutions)
020 $z 9789811240539 $q (ebook for individuals)
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035 $a (OCoLC)1286071236 $z (OCoLC)1285714778
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050 0 0 $a TA357.5.V56 $b I43 2022
082 0 0 $a 620.1/064 $2 23/eng/20211118
100 1 $a Inamuro, Takaji, $e author. $3 916242
245 1 3 $a An introduction to the Lattice Boltzmann method : $b a numerical method for complex boundary and moving boundary flows / $c Takaji Inamuro, Kyoto University, Japan, Masato Yoshino, Shinshu University, Japan, Kosuke Suzuki, Shinshu University, Japan.
264 1 $a Hackensack, NJ ; $b World Scientific ; Tokyo, Japan : $b Maruzen Publishing ;: $b World Scientific, $c [2022]
300 $a xi, 153 pages : $b illustrations ; $c 24 cm
336 $a text $b txt $2 rdacontent
337 $a unmediated $b n $2 rdamedia
338 $a volume $b nc $2 rdacarrier
504 $a Includes bibliographical references (pages 141-150) and index.
520 $a "The book introduces the fundamentals and applications of the lattice Boltzmann method (LBM) for incompressible viscous flows. It is written clearly and easy to understand for graduate students and researchers. The book is organized as follows. In Chapter 1, the SRT- and MRT-LBM schemes are derived from the discrete Boltzmann equation for lattice gases and the relation between the LBM and the Navier-Stokes equation is explained by using the asymptotic expansion (not the Chapman-Enskog expansion). Chapter 2 presents the lattice kinetic scheme (LKS) which is an extension method of the LBM and can save memory because of needlessness for storing the velocity distribution functions. In addition, an improved LKS which can stably simulate high Reynolds number flows is presented. In Chapter 3, the LBM combined with the immersed boundary method (IB-LBM) is presented. The IB-LBM is well suitable for moving boundary flows. In Chapter 4, the two-phase LBM is explained from the point of view of the difficulty in computing two-phase flows with large density ratio. Then, a two-phase LBM for large density ratios is presented. In Appendix, sample codes (available for download) are given for users"-- $c Provided by publisher.
650 0 $a Viscous flow $x Mathematical models. $3 722536
650 0 $a Boundary layer $x Mathematical models. $3 830101
650 0 $a Multiphase flow $x Mathematical models. $3 245423
650 0 $a Lattice Boltzmann methods. $3 670852
700 1 $a Yoshino, Masato, $e author. $3 916243
700 1 $a Suzuki, Kosuke (Mathematician), $e author. $3 916244
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