Explicit formulation for the Dirichlet problem for parabolic-hyperbolic conservation laws

We revisit the Cauchy-Dirichlet problem for degenerate parabolic scalar conservation laws. We suggest a new notion of strong entropy solution. It gives a straightforward explicit characterization of the boundary values of the solution and of the flux, and leads to a concise and natural uniqueness proof, compared to the one of the fundamental work [J. Carrillo, Arch. Ration. Mech. Anal., 1999]. Moreover, general dissipative boundary conditions can be studied in the same framework. The definition makes sense under the specific weak trace-regularity assumption. Despite the lack of evidence that generic solutions are trace-regular (especially in space dimension larger than one), the strong entropy formulation may be useful for modeling and numerical purposes.

[1]  A. Porretta,et al.  L 1 Solutions to First Order Hyperbolic Equations in Bounded Domains , 2003 .

[2]  Steinar Evje,et al.  Monotone Difference Approximations Of BV Solutions To Degenerate Convection-Diffusion Equations , 2000, SIAM J. Numer. Anal..

[3]  J. Vovelle,et al.  DIRICHLET PROBLEM FOR A DEGENERATED HYPERBOLIC-PARABOLIC EQUATION , 2022 .

[4]  Julien Vovelle,et al.  Convergence of finite volume monotone schemes for scalar conservation laws on bounded domains , 2002, Numerische Mathematik.

[5]  Alexis Vasseur,et al.  Strong Traces for Solutions of Multidimensional Scalar Conservation Laws , 2001 .

[6]  E. Yu. Panov,et al.  EXISTENCE OF STRONG TRACES FOR GENERALIZED SOLUTIONS OF MULTIDIMENSIONAL SCALAR CONSERVATION LAWS , 2005 .

[7]  Rinaldo M. Colombo,et al.  Rigorous Estimates on Balance Laws in Bounded Domains , 2015, 1504.01907.

[8]  Michael G. Crandall,et al.  Nonlinear evolution equations in Banach spaces , 1972 .

[9]  E. Panov On generalized entropy solutions of the Cauchy problem for a first-order quasilinear equation in the class of locally summable functions , 2002 .

[10]  Hermano Frid,et al.  Divergence‐Measure Fields and Hyperbolic Conservation Laws , 1999 .

[11]  Boris Andreianov,et al.  Uniqueness for an elliptic-parabolic problem with Neumann boundary condition , 2004 .

[12]  P. Bénilan,et al.  Equations d'évolution dans un espace de Banach quelconque et applications , 1972 .

[13]  J. C. Menéndez,et al.  Renormalized entropy solutions of scalar conservation laws. , 2002 .

[14]  Mohamed Karimou Gazibo,et al.  Convergence of finite volume scheme for degenerate parabolic problem with zero flux boundary condition , 2014, 1402.5221.

[15]  E. Panov On the strong pre-compactness property for entropy solutions of a degenerate elliptic equation with discontinuous flux , 2009 .

[16]  李幼升,et al.  Ph , 1989 .

[17]  A. I. Vol'pert,et al.  Cauchy's Problem for Degenerate Second Order Quasilinear Parabolic Equations , 1969 .

[18]  K. Karlsen,et al.  On the well-posedness of entropy solutions to conservation laws with a zero-flux boundary condition , 2007 .

[19]  Gérard Gagneux,et al.  Formulation forte entropique de lois scalaires hyperboliques-paraboliques dégénérées , 2001 .

[20]  Mohamed Karimou Gazibo Etudes mathématiques et numériques des problèmes paraboliques avec des conditions aux limites , 2013 .

[21]  H. Hagiwara On Nonlinear Evolution Equations in Banach Spaces , 1990 .

[22]  K. Karlsen,et al.  Discrete duality finite volume schemes for doubly nonlinear degenerate hyperbolic-parabolic equations , 2009, 0901.0816.

[23]  J. Nédélec,et al.  First order quasilinear equations with boundary conditions , 1979 .

[24]  Felix Otto,et al.  Initial-boundary value problem for a scalar conservation law , 1996 .

[25]  Anthony Michel,et al.  Entropy Formulation for Parabolic Degenerate Equations with General Dirichlet Boundary Conditions and Application to the Convergence of FV Methods , 2003, SIAM J. Numer. Anal..

[26]  Raimund Bürger,et al.  On a Free Boundary Problem for a Strongly Degenerate Quasi-Linear Parabolic Equation with an Application to a Model of Pressure Filtration , 2002, SIAM J. Math. Anal..

[27]  Tamir Tassa,et al.  Regularity of weak solutions of the nonlinear fokker-planck equation , 1996 .

[28]  Scalar conservation laws with nonlinear boundary conditions , 2007 .

[29]  H. Touré,et al.  Uniqueness of entropy solutions for nonlinear degenerate parabolic problems , 2003 .

[30]  José Carrillo Menéndez Entropy solutions for nonlinear degenerate problems , 1999 .

[31]  J. Aleksic,et al.  Strong traces for averaged solutions of heterogeneous ultra-parabolic transport equations , 2013, 1309.1712.

[32]  E. Yu,et al.  Existence of strong traces for quasi-solutions of multidimensional scalar conservation laws , 2006 .

[33]  B. Andreianov,et al.  Well-posedness of general boundary-value problems for scalar conservation laws , 2015 .

[34]  J. Carrillo,et al.  Scalar conservation laws with general boundary condition and continuous flux function , 2006 .

[35]  S. Kružkov FIRST ORDER QUASILINEAR EQUATIONS IN SEVERAL INDEPENDENT VARIABLES , 1970 .

[36]  Corrado Mascia,et al.  Nonhomogeneous Dirichlet Problems for Degenerate Parabolic-Hyperbolic Equations , 2002 .

[37]  E. Yu. Panov,et al.  EXISTENCE OF STRONG TRACES FOR QUASI-SOLUTIONS OF MULTIDIMENSIONAL CONSERVATION LAWS , 2007 .

[38]  Alessio Porretta,et al.  Two-phase flows involving capillary barriers in heterogeneous porous media , 2009, 1005.5634.

[39]  P. Floch,et al.  Boundary conditions for nonlinear hyperbolic systems of conservation laws , 1988 .

[41]  Mohamed Karimou Gazibo Degenerate parabolic equation with zero flux boundary condition and its approximations , 2013, 1308.6658.

[42]  Entropy formulation of degenerate parabolic equation with zero-flux boundary condition , 2013 .