Summary
The known mathematical results concerning existence, uniqueness, trend to equilibrium and approach to fluid dynamics in discrete kinetic theory are reviewed.
This is a preview of subscription content, log in via an institution to check access.
Access this chapter
Tax calculation will be finalised at checkout
Purchases are for personal use only
Preview
Unable to display preview. Download preview PDF.
References
Cercignani, C., The Boltzmann Equation and its Applications, Springer, New York (1988).
Cercignani, C. Mathematical Methods in Kinetic Theory,, revised edition, Plenum Press, New York (1990).
Di Perna, R, and Lions, P. L., “On the Cauchy problem for the Boltzmann equation. Global existence and stability”, Ann. of Math. 130, 321–366 (1989).
Dudynsky, M., and Ekiel-Jezewska, M. L., “Global existence for relativistic Boltzmann equation”, J. Stat. Phys. 66, 991–1002 (1992).
Carleman, T., Problèmes Mathématiques dans la Théorie Cinétique des Gaz, Alm-qvist and Wiksells, Uppsala (1957).
Broadwell, J. E., “Shock structure in a simple discrete velocity gas” Phys. Fluids, 7, 1243–1247 (1964).
Gatignol, R., Théorie Cinétique des Gaz à Répartition Discrète de Vitesses, Lectures Notes in Physics, 36, Springer, Berlin.
Golse, F., Lions, P.L., Perthame, B., Sentis, R., “Regularity of the moments of the solution of a transport equation”, J. Funct. Anal 76, 110–125, 1988.
Shinbrot, M., “The Carleman model” in Mathematical Problems in the Kinetic Theory of Gases, D. C. Pack and H. Neunzert, Eds., Lang, Frankfurt (1980).
Nishida, T., and Mimura, M., “On the Broadwell model for a simple discrete velocity gas”, Proc. Japan. Acad., 50, 812–817 (1974).
Tartar, L., “Existence globale pour un système hyperbolique semi-linéaire de la théorie cinétique des gaz”, Séminaire Goulaouic-Schwartz, Ecole Polytechnique, no. 1 (1975–1976).
Cabannes, H., “ Solution globale du problème de Cauchy en théorie cinétique discrète”, J. de Mécan., 17, 1–22 (1978).
Cabannes, H., “Solution globale d’un problème de Cauchy en théorie cinétique discrète. Modèle plan”, C.R. Acad. Sci. Paris, sèrie A, 284, 269–272 (1977).
Cabannes, H., “Solution globale de l’équation de Boltzmann discrète pour les modèles spatiaux reguliers à 12 ou 20 vitesses”, Mech. Res. Comm., 10, 317–322 (1983).
Beale, T., “Large-time behavior of discrete velocity Boltzmann equations”, Comm. Math. Phys. 106, 659–678 (1986).
Bony, J. M., “Solutions globales bornées pour les modèles discrète de l’équation de Boltzmann, en dimension 1 d’espace”, in Journées Equations aux Derivées Partielles, no. XVI, École Polytechnique, Palaiseau, France (1987).
Kawashima, S., and Cabannes, H., “Initial-value problem in discrete kinetic theory”, in Rarefied Gas Dynamics: Theoretical and Computational Techniques, E. P. Muntz, D. P. Weaver and D. H. Campbell, eds., 148–154, AIAA, Washington, D. C. (1989).
Platkowski, T., and Illner, R., “Discrete velocity models of the Boltzmann equation. A survey on the mathematical aspects of the theory”, SIAM Rev., 30, 213–255 (1988).
Bony, J. M., “Existence globale et diffusion en théorie cinétique discrète”, in Advances in Kinetic Theory and Continuum Mechanics, 81–90, R. Gatignol and Soubbara-Mayer. Eds., Springer, Berlin (1991).
Illner, R., “Global existence results for discrete velocity models of the Boltzmann equation”, J. Méc. Théor. Appl, 1, 611–622 (1982).
Bony, J. M., “Existence globale à données de Cauchy petites pour les modèles discrets de l’équation de Boltzmann”, Comm. P.D.E. 16, 533–545 (1991).
Shizuta, Y., and Kawashima, S., “Systems of equations of hyperbolic- parabolic type with the applications to the discrete Boltzmann equation”, Hokkaido Math. J., 14, 249–275 (1985).
Cercignani, C., “Sur des critéres d’existence globale en théorie cinetique discrète”, C. R. Acad. Sci. Paris, sèrie I, 301, 89 (1985).
Cercignani, C., and Shinbrot, M., “Global Existence for Some Discrete Velocity Models”, Comm. in PDE, 12, 307–314 (1987).
Kawashima, S., “Global solutions of the initial-boundary value problems for the discrete Boltzmann equation, in Nonlinear Analysis, Theory, Methods & Applications, 17, 577–597 (1991).
Bony, J. M., “Problème de Cauchy et diffusion à données petites pour les modèles discrete de la cinétique des gaz”, in Journées Equations aux Derivées Partielles, École Polytechnique, Palaiseau, France (1990).
Slemrod, M., “Large time behavior of the Broad well model of a discrete velocity gas with specularly reflective boundary conditions”, Arch. Rational Mech. Anal. 111, 323–342 (1990).
Cercignani, C., “The trend to equilibrium in discrete and continuous kinetic theory: a comparison” in Discrete Models of Fluid Dynamics, A. S. Alves, Ed., 12–21, World Scientific, Singapore (1991).
Cercignani, C., “Equilibrium States and Trend to Equilibrium in a Gas According to the Boltzmann Equation”, Rendiconti di Matematica, Serie VII, 10, 77–95 (1990)
Desvillettes, L., “Convergence to equilibrium in large time for Boltzmann and BGK equations”, Arch. Rational Mech. Anal 110, 73–91 (1990).
Cercignani, C., Illner, R., and Shinbrot, M., “A boundary value problem for discrete-velocity models”, Duke Math. Journal 55, 889–900 (1987).
Cercignani, C., Illner, R., and Shinbrot, M., “A Boundary Value Problem for the Two-Dimensional Broadwell Model”, Comm. Math. Phys. 114, 687–698 (1988).
Cercignani, C., Illner, R., Shinbrot, M., and Pulvirenti, M., “On nonlinear stationary half-space problems in discrete kinetic theory”, J. Stat. Phys. 52, 885–896 (1988).
Bardos, C., Golse, F., and Levermore, D., “Fluid Dynamic Limits of Discrete Velocity Kinetic Equations”, in Advances in Kinetic Theory and Continuum Mechanics, 57–71, R. Gatignol and Soubbaramayer. Eds., Springer, Berlin (1991).
Author information
Authors and Affiliations
Editor information
Rights and permissions
Copyright information
© 1993 Friedr. Vieweg & Sohn Verlagsgesellschaft mbH, Braunschweig/Wiesbaden
About this chapter
Cite this chapter
Cercignani, C. (1993). Hyperbolic Problems in Kinetic Theory. In: Donato, A., Oliveri, F. (eds) Nonlinear Hyperbolic Problems: Theoretical, Applied, and Computational Aspects. Notes on Numerical Fluid Mechanics (NNFM), vol 43. Vieweg+Teubner Verlag. https://doi.org/10.1007/978-3-322-87871-7_15
Download citation
DOI: https://doi.org/10.1007/978-3-322-87871-7_15
Publisher Name: Vieweg+Teubner Verlag
Print ISBN: 978-3-528-07643-6
Online ISBN: 978-3-322-87871-7
eBook Packages: Springer Book Archive