AbstractReaction–diffusion equations arise in many fields of science and engineering. Often, their solutions enjoy a number of physical properties. We design, in a systematic way, new non-standard finite difference schemes, which replicate three of these properties. The first property is the stability/instability of the fixed points of the associated space independent equation. This property is preserved by non-standard one- and two-stage theta methods, presented in the general setting of stiff or non-stiff systems of differential equations. Schemes, which preserve the principle of conservation of energy for the corresponding stationary equation (second property) are constructed by non-local approximation of nonlinear reactions. Assemblingo...
We identify sufficient conditions for the stability of some well-known finite difference schemes for...
Many phenomena of interest in physiology and biochemistry are characterized by reactions among sever...
Energy preserving schemes achieve unconditional stability for nonlinear systems by establishing disc...
AbstractReaction–diffusion equations arise in many fields of science and engineering. Often, their s...
The oldest and most useful technique to approximate the solution of differential equations is the fi...
AbstractReaction–diffusion equations are commonly used in different science and engineering fields t...
In this paper we consider explicit, implicit and semiimplicit finite difference schemes for a genera...
International audienceWe study the construction of a non-standard finite differences numerical schem...
Discretization schemes based on NonStandard Finite Differences (NSFD) are a modification of Standard...
In this paper we design and analyse stability-preserving nonstandard finite difference schemes based...
AbstractThe purpose of this paper is to present some iterative methods for numerical solutions of a ...
AbstractWe propose a new numerical approach to compute nonclassical solutions to hyper-bolic conserv...
In recent years it has been shown that some unconventional or nonstandard finite difference schemes ...
We propose a new numerical approach to compute nonclassical solutions to hyperbolic conservation law...
We identify sufficient conditions for the stability of some well-known finite difference schemes for...
We identify sufficient conditions for the stability of some well-known finite difference schemes for...
Many phenomena of interest in physiology and biochemistry are characterized by reactions among sever...
Energy preserving schemes achieve unconditional stability for nonlinear systems by establishing disc...
AbstractReaction–diffusion equations arise in many fields of science and engineering. Often, their s...
The oldest and most useful technique to approximate the solution of differential equations is the fi...
AbstractReaction–diffusion equations are commonly used in different science and engineering fields t...
In this paper we consider explicit, implicit and semiimplicit finite difference schemes for a genera...
International audienceWe study the construction of a non-standard finite differences numerical schem...
Discretization schemes based on NonStandard Finite Differences (NSFD) are a modification of Standard...
In this paper we design and analyse stability-preserving nonstandard finite difference schemes based...
AbstractThe purpose of this paper is to present some iterative methods for numerical solutions of a ...
AbstractWe propose a new numerical approach to compute nonclassical solutions to hyper-bolic conserv...
In recent years it has been shown that some unconventional or nonstandard finite difference schemes ...
We propose a new numerical approach to compute nonclassical solutions to hyperbolic conservation law...
We identify sufficient conditions for the stability of some well-known finite difference schemes for...
We identify sufficient conditions for the stability of some well-known finite difference schemes for...
Many phenomena of interest in physiology and biochemistry are characterized by reactions among sever...
Energy preserving schemes achieve unconditional stability for nonlinear systems by establishing disc...