Available in electronic format
Available in print format		 Mathematics of Computation
Journal of the American Mathematical Society
ISSN 1088-6842(e) ISSN 0025-5718(p)
Previous issue | Table of contents | Next issue
Articles in press | Recently posted articles | Most recent issue | All issues
Previous Article | Next Article
     

Explicit diffusive kinetic schemes for nonlinear degenerate parabolic systems

Author(s): D. Aregba-Driollet; R. Natalini; S. Tang.
Journal: Math. Comp. 73 (2004), 63-94.
MSC (2000): Primary 65M06; Secondary 76M20, 76RXX, 82C40
Posted: August 26, 2003
Retrieve article in: PDF DVI PostScript

Abstract | References | Similar articles | Additional information

Abstract: We design numerical schemes for nonlinear degenerate parabolic systems with possibly dominant convection. These schemes are based on discrete BGK models where both characteristic velocities and the source-term depend singularly on the relaxation parameter. General stability conditions are derived, and convergence is proved to the entropy solutions for scalar equations.

References:

1.
D. Aregba-Driollet, R. Natalini,
Convergence of relaxation schemes for conservation laws,
Appl. Anal. 61 (1996), 163-193.

2.
D. Aregba-Driollet, R. Natalini,
Discrete Kinetic Schemes for Multidimensional Systems of Conservation Laws, SIAM J. Numer. Anal. 37 (2000), no 6, pp. 1973-2004. MR 2001f:65090

3.
F. Bouchut, Entropy satisfying flux vector splittings and kinetic BGK models, Numer. Math. 94 (2003), 623-672.

4.
F. Bouchut, F. Golse, and M. Pulvirenti,
Kinetic equations and asymptotic theory,
Series in Appl. Math., Gauthiers-Villars, 2000.

5.
F. Bouchut, F. Guarguaglini, and R. Natalini, Diffusive BGK Approximations for Nonlinear Multidimensional Parabolic Equations,
Indiana Univ. Math. J., 49:723-749, 2000. MR 2001k:35162

6.
J. Carrillo, Entropy solutions for nonlinear degenerate problems, Arch. Ration. Mech. Anal. 147 (1999) no 4, 269-361. MR 2000m:35132

7.
M. Crandall and A. Majda, Monotone difference approximations for scalar conservation laws, Math. Comp. 34 (1980), 1-21. MR 81b:65079

8.
P. D'Ancona and S. Spagnolo.
The Cauchy problem for weakly parabolic systems.
Math. Ann., 309:307-330, 1997. MR 98g:35119

9.
S.D. Eidel'man.
Parabolic Systems.
North-Holland Publishing Company, 1969. MR 40:6023

10.
Magne S. Espedal and K. Hvistendahl Karlsen, Numerical Solution of Reservoir Flow Models Based on Large Time Step Operator Splitting Algorithms, A. Fasano and H. van Duijn, editors, ``Filtration in Porous Media and Industrial Applications", Lecture Notes in Mathematics, Springer, no. 1734, pp. 3-77. MR 2002a:76115

11.
S. Evje and K.H. Karlsen, Monotone difference approximation of BV solutions to degenerate convection-diffusion equations, SIAM J. Numer. Anal. 37 (2000), no 6, pp. 1838-1860. MR 2001g:65110
12.
S. Gottlieb, C.W. Shu, and E. Tadmor, Strong stability-preserving high-order time discretization methods, SIAM Rev. 43 (2001), 89-112 (electronic). MR 2002f:65132

13.
S. Gottlieb, C.W. Shu, Total variation diminishing Runge-Kutta schemes, Math. Comp. 67 (1998), 73-85. MR 98c:65122

14.
B. Hanouzet, R. Natalini, Weakly coupled systems of quasilinear hyperbolic equations, Diff. Integral Eq. 9 (1996), 1279-1292. MR 97h:35138

15.
S. Jin, Runge-Kutta methods for hyperbolic conservation laws with stiff relaxation terms, J. Comput. Phys. 122 (1995), no 1, 51-67. MR 96g:65084

16.
S. Jin, H.L. Liu, Diffusion limit of a hyperbolic system with relaxation, Meth. and Appl. Anal. 5 (1998), 317-334. MR 2000k:35176

17.
S. Jin, L. Pareschi, G. Toscani, Diffusive relaxation schemes for multiscale discrete-velocity kinetic equations, SIAM J. Numer. Anal. 35 (1998), 2405-2439. MR 99k:76100

18.
S. Jin and Z. Xin, The relaxation schemes for systems of conservation laws in arbitrary space dimensions, Comm. Pure Appl. Math. 48 (1995), 235-277. MR 96c:65134

19.
K. H. Karlsen, K.-A. Lie, J. R. Natvig, H. F. Nordhaug, and H. K. Dahle, Operator splitting methods for systems of convection-diffusion equations: nonlinear error mechanisms and correction strategies. J. of Computational Physics 173 (2001) 636-663. MR 2002h:76093

20.
S.N. Kruzkov, First-order quasilinear equations in several independent variables, Math. USSR Sb. 10 (1970), 217-243. MR 42:2159

21.
A. Kurganov and E. Tadmor, New high-resolution central schemes for nonlinear conservation laws and convection-diffusion equations, Journal of Computational Physics, 160 (2000) 214-282. MR 2001d:65135

22.
C. Lattanzio, R. Natalini, Convergence of diffusive BGK approximations for parabolic systems, Proc. Roy. Soc. Edinburgh Sect. A 132 (2002), no. 2, 341-358. MR 2003e:35136

23.
P.L. Lions, G. Toscani, Diffusive limit for finite velocity Boltzmann kinetic models, Rev. Mat. Iberoamericana 13 (1997), 473-513. MR 99g:76127

24.
T.-P. Liu, Hyperbolic conservation laws with relaxation, Comm. Math. Phys. 108 (1987), 153-175. MR 88f:35092

25.
C. Mascia, A. Porretta, and A. Terracina, Nonhomogeneous Dirichlet problems for degenerate parabolic-hyperbolic equations, Arch. Ration. Mech. Anal. 163:87-124, 2002. MR 2003e:35217

26.
K. W. Morton, Numerical solution of convection-diffusion problems. Applied Mathematics and Mathematical Computation, 12. Chapman & Hall, London, 1996. MR 98b:65004

27.
R. Natalini, Convergence to equilibrium for the relaxation approximations of conservation laws, Comm. Pure Appl. Math. 49 (1996), 795-823. MR 97c:35131

28.
R. Natalini, A discrete kinetic approximation of entropy solutions to multidimensional scalar conservation laws, J. Diff. Eq. 148 (1998), 292-317. MR 99e:35139

29.
Ole{\u{\i}}\kern.15emnik, O. A. and Kruzkov, S. N., Quasi-linear parabolic second-order equations with many independent variables, Russian Math. Surveys 16 (1961), pp. 105-146. MR 25:6289

30.
B. Perthame, Boltzmann type schemes for gas dynamics and the entropy property, SIAM J. Numer. Anal. 27 (1990), no 6, 1405-1421. MR 91k:65135

31.
C.W. Shu, S. Osher, Efficient implementation of essentially non oscillatory shock-capturing schemes, J. Comput. Phys. 77 (1988), 439-471. MR 89g:65113

32.
M.E. Taylor.
Partial differential equations, III. Nonlinear equations, volume 117 of Applied Mathematical Sciences.
Springer-Verlag, 1996. MR 98k:35001

Similar Articles:

Retrieve articles in Mathematics of Computation with MSC (2000): 65M06, 76M20, 76RXX, 82C40

Retrieve articles in all Journals with MSC (2000): 65M06, 76M20, 76RXX, 82C40

Additional Information:

D. Aregba-Driollet
Affiliation: Mathématiques Appliquées de Bordeaux, Université Bordeaux 1, 351 cours de la Libération, F-33405 Talence, France
Email: aregba@math.u-bordeaux.fr

R. Natalini
Affiliation: Istituto per le Applicazioni del Calcolo ``M. Picone'', Consiglio Nazionale delle Ricerche, Viale del Policlinico 137, I--00161 Roma, Italia
Email: natalini@iac.rm.cnr.it

S. Tang
Affiliation: Department of Mechanics and Engineering Sciences, Peking University, Beijing 100871, People's Republic of China and Fachbereich Mathematik und Statistik, Universität Konstanz, 78457 Konstanz, Germany
Email: maotang@pku.edu.cn; tangs@fmi.uni-konstanz.de

DOI: 10.1090/S0025-5718-03-01549-7
PII: S 0025-5718(03)01549-7
Received by editor(s): November 21, 2000
Received by editor(s) in revised form: January 11, 2002
Posted: August 26, 2003
Additional Notes: Work partially supported by European TMR projects HCL # ERB FMRX CT96 0033 and NPPDE # ERB FMRX CT98 0201, Chinese Special Funds for Major State Basic Research Project, and NSFC
Copyright of article: Copyright 2003, American Mathematical Society

  AMS Website Logo Small Comments: webmaster@ams.org
© Copyright 2008, American Mathematical Society
Privacy Statement 		Search the AMSPowered by Google