We present a family of schemes for the approximation of one dimensional convection-diffusion equations. It is based on a linearization technique that allows to treat explicitly the hyperbolic term and linearly implicitly the parabolic one. This avoids the parabolic stability constraint of explicit schemes, and does not require any non-linear solver for the implicit problem. We present several numerical simulations to show the effectiveness of the proposed schemes and to investigate their stability, convergence and accuracy. In particular, since the proposed schemes provide to be accurate for both smooth and non-smooth solutions, they turn out to be attractive for adaptivit
We introduce a class of alternating direction implicit (ADI) methods, based on approximate factoriza...
In this paper, numerical solutions for convection-diffusion equation via non-polynomial splines are ...
A modified parabolic equation for adaptive monotone difference schemes based on equal- arclength mes...
We present a family of schemes for the approximation of one dimensional convection-diffusion equatio...
Abstract: Implicit difference scheme with second order of accuracy both in time and in spa...
Abstract: Implicit difference scheme with second order of accuracy is constructed for conv...
An unconditionally stable alternating direction explicit scheme (ADE) to solve the one-dimensional u...
In this work we present a family of relaxation schemes for non linear convection diffusion problems,...
A new approach towards the assessment and derivation of numerical methods for convection dominated p...
When solving convection-diffusion equations using the finite difference schemes, the convection term...
AbstractWe present an algorithm for parabolic equations with (possibly nonlinear) convective terms, ...
In this article we consider the scalar transport governed by the convection-diffusion equation with ...
Explicit difference approximations of parabolic initial boundary value problems are usually stable o...
Abstract: In the paper the adaptive grid method for numerical solution of one dimensional ...
In this work we present a family of relaxation schemes for non linear convection diffusion problems,...
We introduce a class of alternating direction implicit (ADI) methods, based on approximate factoriza...
In this paper, numerical solutions for convection-diffusion equation via non-polynomial splines are ...
A modified parabolic equation for adaptive monotone difference schemes based on equal- arclength mes...
We present a family of schemes for the approximation of one dimensional convection-diffusion equatio...
Abstract: Implicit difference scheme with second order of accuracy both in time and in spa...
Abstract: Implicit difference scheme with second order of accuracy is constructed for conv...
An unconditionally stable alternating direction explicit scheme (ADE) to solve the one-dimensional u...
In this work we present a family of relaxation schemes for non linear convection diffusion problems,...
A new approach towards the assessment and derivation of numerical methods for convection dominated p...
When solving convection-diffusion equations using the finite difference schemes, the convection term...
AbstractWe present an algorithm for parabolic equations with (possibly nonlinear) convective terms, ...
In this article we consider the scalar transport governed by the convection-diffusion equation with ...
Explicit difference approximations of parabolic initial boundary value problems are usually stable o...
Abstract: In the paper the adaptive grid method for numerical solution of one dimensional ...
In this work we present a family of relaxation schemes for non linear convection diffusion problems,...
We introduce a class of alternating direction implicit (ADI) methods, based on approximate factoriza...
In this paper, numerical solutions for convection-diffusion equation via non-polynomial splines are ...
A modified parabolic equation for adaptive monotone difference schemes based on equal- arclength mes...