लैटिस-बोल्ट्ज़मैन मैथड

बोल्ट्ज़्मैन समीकरण, एकल पार्टिकल प्रोबैब्लिटी वितरण फ़ंक्शन ${\displaystyle f(x,v,t)}$  के लिये एवॉल्यूशन समीकरण होता है:

${\displaystyle \partial _{t}f+v\partial _{x}f+F\partial _{v}f=\Omega }$ 

जहां ${\displaystyle F}$  बाहरी बल है एवं ${\displaystyle \Omega }$  कोलीज़न समाकलक है। लैटिस बोल्ट्ज़्मैन मैथड इस समीकरण को डिस्क्रीटाइज़ कर देता है। इसके लिये ये स्पेस को एक लैटिस एवं वेलोसिटी स्पेस को वेलोसिटी सेट्स ${\displaystyle v_{i}}$  में डिस्क्रीटाइज़ कर देता है। तब बोल्ट्ज़्मैन समीकरण, जो अब लैटिस बोल्ट्ज़्मैन समीकरण बन चुका है, बन जाता है:

${\displaystyle f_{i}(x+v_{i},t+1)-f_{i}(x,t)+F_{i}=\Omega }$ 

The collision operator is often approximated by a BGK collision operator:

${\displaystyle \Omega ={\frac {1}{\tau }}(f_{i}^{0}-f_{i})}$ 

where ${\displaystyle f_{i}^{0}}$  is the local equilibrium distribution.

The moments of the ${\displaystyle f_{i}}$  give the local conserved quantities. The density is given by

${\displaystyle \rho =\sum _{i}f_{i}}$ 

and the local momentum is given by

${\displaystyle \rho u=\sum _{i}f_{i}v_{i}.}$ 

For the popular isothermal lattice Boltzmann methods these are the only conserved quantities. Thermal models also conserve energy and therefore have an additional conserved quantity:

${\displaystyle \rho \theta +\rho uu=\sum _{i}f_{i}v_{i}v_{i}.}$ 

The collision operator has to respect the conservation laws. Therefore the equilibirum distribution ${\displaystyle f_{i}^{0}}$  must have the same conserved moments as the ${\displaystyle f_{i}}$ .

• PowerFLOW: commercial CFD code which uses LBM, created and distributed by Exa Corp.
• OpenLB: Open source library based on LBM, parallel, C++
• El'Beem: free CFD code (GPL) which uses LBM
• J-Lattice-Boltzmann: interactive Java applet for experimenting with LBM
• C examples^{[मृत कड़ियाँ]}: Some simple example LBM code in C.
• Palabos: Open source lattice Boltzmann code
• Sailfish: Open Source LBM code (LGPL) for Graphics Processing Units (CUDA/OpenCL)
• waLBerla: Open Source HPC software framework for the LBM, massively parallel, C++

• Succi, Sauro (2001). The Lattice Boltzmann Equation for Fluid Dynamics and Beyond. ऑक्सफोर्ड यूनिवर्सिटी प्रेस. आई॰ऍस॰बी॰ऍन॰ 0198503989.
• Wolf-Gladrow, Dieter (2000). Lattice-Gas Cellular Automata and Lattice Boltzmann Models. Springer Verlag. आई॰ऍस॰बी॰ऍन॰ 9783540669739.
• Sukop, Michael C. and Daniel T. Thorne, Jr. (2007). Lattice Boltzmann Modeling: An Introduction for Geoscientists and Engineers. Springer. आई॰ऍस॰बी॰ऍन॰ 9783540279815.सीएस1 रखरखाव: एक से अधिक नाम: authors list (link)
• Jian Guo Zhou (2004). Lattice Boltzmann Methods for Shallow Water Flows. Springer. आई॰ऍस॰बी॰ऍन॰ 3540407464.

• LBMethod.org: A site with various resources related to LBM, including a forum.
• LBM Method
• Lattice Boltzmann summary
• Erlangen Lattice Boltzmann mailing list
• DSFD mailing list: sends information about DSFD and related conferences, opportunities for doctoral, postdoctoral, faculty and industry positions for applicants who have experience with Lattice Boltzmann or other related methods.
• dsfd.org: Website of the annual DSFD conference series (1986 -- now) where advances in theory and application of the lattice Boltzmann method are discussed
• Website of the annual ICMMES conference on Lattice Boltzmann methods and their applications