A numerical conception of entropy for quasi-linear equations
Open Access
- 1 January 1977
- journal article
- Published by American Mathematical Society (AMS) in Mathematics of Computation
- Vol. 31 (140) , 848-872
- https://doi.org/10.1090/s0025-5718-1977-0478651-3
Abstract
A family of difference schemes solving the Cauchy problem for quasi-linear equations is studied. This family contains well-known schemes such as the decentered, Lax, Godounov or Lax-Wendroff schemes. Two conditions are given, the first assures the convergence to a weak solution and the second, more restrictive, implies the convergence to the solution in Kružkov’s sense, which satisfies an entropy condition that guarantees uniqueness. Some counterexamples are proposed to show the necessity of such conditions.Keywords
This publication has 9 references indexed in Scilit:
- Layering methods for nonlinear partial differential equations of first orderAnnales de l'institut Fourier, 1972
- Difference Methods for Nonlinear First-Order Hyperbolic Systems of EquationsMathematics of Computation, 1970
- On the Right Weak Solution of the Cauchy Problem for a Quasilinear Equation of First OrderIndiana University Mathematics Journal, 1969
- Difference Methods for Initial-Value ProblemsMathematics of Computation, 1968
- Global solutions of the cauchy problem for quasi‐linear first‐order equations in several space variablesCommunications on Pure and Applied Mathematics, 1966
- Uniqueness and stability of the generalized solution of the Cauchy problem for a quasi-linear equationAmerican Mathematical Society Translations: Series 2, 1963
- Discontinuous solutions of non-linear differential equationsPublished by American Mathematical Society (AMS) ,1963
- Systems of conservation lawsCommunications on Pure and Applied Mathematics, 1960
- Weak solutions of nonlinear hyperbolic equations and their numerical computationCommunications on Pure and Applied Mathematics, 1954