Modélisation, analyse mathématique et simulations numériques de ...
Modélisation, analyse mathématique et simulations numériques de ...
Modélisation, analyse mathématique et simulations numériques de ...
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tel-00656013, version 1 - 3 Jan 2012<br />
BIBLIOGRAPHIE 177<br />
[87] Ferrari, S. and Saleri, F., A new two-dimensional Shallow Water mo<strong>de</strong>l including<br />
pressure effects and slow varying bottom topography, M2AN Math. Mo<strong>de</strong>l. Numer.<br />
Anal. (2004)<br />
[88] Filb<strong>et</strong>, F. and Russo, G., High or<strong>de</strong>r numerical m<strong>et</strong>hods for the space nonhomogeneous<br />
Boltzmann equation. J. Comput. Phys. 186, (2003) pp. 457–480.<br />
[89] Filb<strong>et</strong>, F., Pareschi, L. and Toscani, G., Accurate numerical m<strong>et</strong>hods for the collisional<br />
motion of (heated) granular flows. J. Comput. Phys. 202, (2005) pp. 216–235.<br />
[90] Filb<strong>et</strong>, F., Mouhot, C. and Pareschi, L., Solving the Boltzmann equation in N log 2N.<br />
SIAM J. Sci. Comput. 28, (2006) pp. 1029–1053<br />
[91] Filb<strong>et</strong>, F., An asymptotically stable scheme for diffusive coagulation-fragmentation<br />
mo<strong>de</strong>ls, Comm. Math. Sciences, 6, (2008) pp. 257–280.<br />
[92] Filb<strong>et</strong>, F. and Jin, S., A class of asymptotic preserving schemes for kin<strong>et</strong>ic equations<br />
and related problems with stiff sources, J. Comp. Physics, 229, (2010)<br />
[93] Filb<strong>et</strong>, F. and Jin, S., An asymptotic preserving scheme for the ES-BGK mo<strong>de</strong>l for<br />
the Boltzmann equation, J. Sci. Comp. 46, (2011)<br />
[94] Filb<strong>et</strong>, F. and Rambaud, A., Analysis of an Asymptotic Preserving scheme for relaxation<br />
systems, Submitted (2011)<br />
[95] Flori, F., Orenga, P. and Peybernes, M., Sur un problème <strong>de</strong> Shallow Water bicouche<br />
avec conditions aux limites <strong>de</strong> Dirichl<strong>et</strong>, C.R. Acad. Sci. Paris (2005)<br />
[96] Gab<strong>et</strong>ta, E., Pareschi, L. and Toscani, G., Relaxation schemes for nonlinear kin<strong>et</strong>ic<br />
equations, SIAM J. Numer. Anal. 34 (1997), 2168–2194<br />
[97] Galdi, P.G., An introduction to the mathematical theory of the NS equations, vol I<br />
& II, Springer (1994)<br />
[98] Gallouët, T., Hérard J-M. and Seguin, N., Some approximate Godunov schemes to<br />
compute shallow-water equations with topography, Computers and Fluids (2003)<br />
[99] Gérard-Var<strong>et</strong>, D., Formal <strong>de</strong>rivation of boundary layers in fluid mechanics, J. Math.<br />
Fluid Mech. (2005)<br />
[100] Gérard-Var<strong>et</strong>, D., and Paul, T. Remarks on boundary layers expansions, Comm. in<br />
Part. Diff. Eq. (2008)<br />
[101] Gerbeau, J.-F. and Perthame, B., Derivation of viscous Saint-Venant system for<br />
laminar shallow water; numerical validation, Discr<strong>et</strong>e Contin. Dyn. Syst. Ser. B (2001)<br />
[102] Godlewski, E. and Raviart P.-A., Numerical approximations of hyperbolic systems<br />
of conservation laws, Appl. Math. Sc. (1996)
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