This paper derives sharp l$\infty$ and l1 estimates of the error arising from an explicit approximation of the constant coefficient 1D convection/diffusion equation with Dirac initial data. The analysis embeds the discrete equations within a semi-discrete system of equations which can be solved by Fourier analysis. The error estimates are then obtained through asymptotic approximation of the integrals resulting from the inverse Fourier transform. this research is motivated by the desire to prove convergence of approximations to adjoint partial differential equations
AbstractIn convection-diffusion problems a first-order upwind difference approximation is usually us...
This paper analyzes the convergence of discrete approximations to the linearized equations arising f...
For some boundary or initial value problems, the presence of a Dirac distribution on the boundary or...
This paper derives sharp estimates of the error arising from explicit and implicit approximations of...
This paper derives sharp l$\infty$ and l1 estimates of the error arising from an explicit approximat...
This paper derives sharp estimates of the error arising from explicit and implicit approximations of...
We consider first-order finite difference schemes for a nonlinear degenerate convection-diffusion eq...
summary:We describe a numerical method for the equation $u_t + pu_x - \varepsilon u_{xx} = f$ in $(0...
Abstract. We consider semi-discrete first-order finite difference schemes for a nonlinear degenerate...
An a posteriori bound for the error measured in the discontinuous energy norm for a discontinuous Ga...
This paper continues the convergence analysis in [M. Giles and S. Ulbrich, SIAM J. Numer. Anal., 48 ...
AbstractStability problems related to some finite-difference representations of the one-dimensional ...
Numerical approximations to the solution of a linear singularly perturbed parabolic convection-diffu...
All numerical simulations of turbulence (DNS or LES) involve some discretization errors. The integri...
Let us consider the singularly perturbed model problem Lu := -epsilon laplace u-bu_x+cu = f with h...
AbstractIn convection-diffusion problems a first-order upwind difference approximation is usually us...
This paper analyzes the convergence of discrete approximations to the linearized equations arising f...
For some boundary or initial value problems, the presence of a Dirac distribution on the boundary or...
This paper derives sharp estimates of the error arising from explicit and implicit approximations of...
This paper derives sharp l$\infty$ and l1 estimates of the error arising from an explicit approximat...
This paper derives sharp estimates of the error arising from explicit and implicit approximations of...
We consider first-order finite difference schemes for a nonlinear degenerate convection-diffusion eq...
summary:We describe a numerical method for the equation $u_t + pu_x - \varepsilon u_{xx} = f$ in $(0...
Abstract. We consider semi-discrete first-order finite difference schemes for a nonlinear degenerate...
An a posteriori bound for the error measured in the discontinuous energy norm for a discontinuous Ga...
This paper continues the convergence analysis in [M. Giles and S. Ulbrich, SIAM J. Numer. Anal., 48 ...
AbstractStability problems related to some finite-difference representations of the one-dimensional ...
Numerical approximations to the solution of a linear singularly perturbed parabolic convection-diffu...
All numerical simulations of turbulence (DNS or LES) involve some discretization errors. The integri...
Let us consider the singularly perturbed model problem Lu := -epsilon laplace u-bu_x+cu = f with h...
AbstractIn convection-diffusion problems a first-order upwind difference approximation is usually us...
This paper analyzes the convergence of discrete approximations to the linearized equations arising f...
For some boundary or initial value problems, the presence of a Dirac distribution on the boundary or...