References
- Beugre D, Calvo S, Toye D, Crine M, Marchat P: ‘Lattice Boltzmann 3D flow simulation in metallic foam’, Proc. ACOMEN Conf. on ‘Advanced computational method in engineering, advanced materials’, Liege, Belgium, May 2008, University of Liege, 255–301.
- McNamara G, Zanetti G: ‘Use of Boltzmann equation to simulate lattice–gas automata,’ Phys. Rev. Lett., 1988, 61, 2332–2340.
- Higuera FJ, Jimenez J: ‘Boltzmann approach to lattice gas simulations’, Europhys. Lett., 1989, 9, 663–664.
- Yu D, Mei R, Luo LS, Shyy W: ‘Viscous flow computations with the lattice Boltzmann method’, Prog. Aerosp. Sci., 2003, 39, 329–367.
- Cox SJ, Weaire D, Fatima Vaz M: ‘The transition from two-dimensional to three dimensional foam structures’, Eur. Phys. J. E, 2002, 7E, 311–315.
- Hutzler S, Weaire D, Bolton F: ‘Model simulations of two dimensional liquid and solid foams’, Proc. 15th IMACS World Cong. on ‘Scientific computation, modelling and applied mathematics’, (ed. , Sydow A, ed), Vol. 3, 277–282; 1997, Berlin, Wissenschaft und Technik Verlag.
- Agarwal R, Yun Y, Rishman B, Beyond R: ‘Navier–Stokes: Burett equations for flow in continuum transition regime’, Phys. Fluids, 2001, 13, 3061–3085.
- Arnold DN, Brezzi F, Fortin M: ‘A stable finite element for the Stokes equations’, Calcolo, 1984, 21, 337–344.
- Weaire D, Cox SJ, Graner F: ‘Uniqueness, stability and Hessian eigen-values for two-dimensional bubble clusters’, Eur. Phys. J. E, 2002, 7E, 123–127.
- Korner C, Thies M, Robert F: ‘Modeling foaming with lattice Boltzmann automata’, Adv. Eng. Mater., 2002, 10, 765–769.
- Korner C, Thies M, Arnold M, Singer RF: in‘Metal foams and porous metals structures’(, Banhart J, et al..), 93–98; 2001, Bremen, MIT Verlag.