AbstractA numerical method for first order nonlinear scalar hyperbolic conservation laws in one-dimension is presented, using an idea by Dafermos. In this paper it is proved that it may be used as a numerical method for a general flux function and a general initial value. It is possible to give explicit error estimates for the numerical method. The error in the method is far smaller than in any other method. The numerical method is illustrated in an example
. Explicit and semi--implicit finite difference schemes approximating nonhomogenous scalar conservat...
Abstract A new class of Godunov-type numerical methods (called here weakly nonoscillatory or WNO) fo...
We develop here special technique for evaluating residual in finite volume schemes for nonlinear sca...
AbstractA numerical method for first order nonlinear scalar hyperbolic conservation laws in one-dime...
In this paper we consider numerical approximations of hyperbolic conservation laws in the one-dimens...
Recently there have been numerous advances in the development of numerical algorithms to solve conse...
The solution of a conservation law may develop discontinuities like shocks and rarefactions waves, e...
This paper contains a survey of some important numerical methods for one-dimensional hyper-bolic con...
AbstractIn the paper, a kind of one-dimensional scalar hyperbolic conservation laws with flux functi...
AbstractIn this paper we estimate the error of upwind first order finite volume schemes applied to s...
AbstractIn this paper we first briefly review the very high order ADER methods for solving hyperboli...
The present work is concerned with the extension of the theory of characteristics to conservation la...
This article contains a survey of some important finite-difference methods for one-dimensional hyper...
This paper deals with the numerical approximation of linear and non linear hyperbolic problems. We a...
We are interested in a class of numerical schemes for the optimization of nonlinear hyperbolic parti...
. Explicit and semi--implicit finite difference schemes approximating nonhomogenous scalar conservat...
Abstract A new class of Godunov-type numerical methods (called here weakly nonoscillatory or WNO) fo...
We develop here special technique for evaluating residual in finite volume schemes for nonlinear sca...
AbstractA numerical method for first order nonlinear scalar hyperbolic conservation laws in one-dime...
In this paper we consider numerical approximations of hyperbolic conservation laws in the one-dimens...
Recently there have been numerous advances in the development of numerical algorithms to solve conse...
The solution of a conservation law may develop discontinuities like shocks and rarefactions waves, e...
This paper contains a survey of some important numerical methods for one-dimensional hyper-bolic con...
AbstractIn the paper, a kind of one-dimensional scalar hyperbolic conservation laws with flux functi...
AbstractIn this paper we estimate the error of upwind first order finite volume schemes applied to s...
AbstractIn this paper we first briefly review the very high order ADER methods for solving hyperboli...
The present work is concerned with the extension of the theory of characteristics to conservation la...
This article contains a survey of some important finite-difference methods for one-dimensional hyper...
This paper deals with the numerical approximation of linear and non linear hyperbolic problems. We a...
We are interested in a class of numerical schemes for the optimization of nonlinear hyperbolic parti...
. Explicit and semi--implicit finite difference schemes approximating nonhomogenous scalar conservat...
Abstract A new class of Godunov-type numerical methods (called here weakly nonoscillatory or WNO) fo...
We develop here special technique for evaluating residual in finite volume schemes for nonlinear sca...