In this paper we study some numerical methods to solve a model one-dimensional convection–diffusion equation. The semi-discretisation of the space variable results into a system of ordinary differential equations and the solution of the latter involves the evaluation of a matrix exponent. Since the calculation of this term is computationally expensive, we study some methods based on Krylov subspace and on Restrictive Taylor series approximation respectively. We also consider the Chebyshev Pseudospectral collocation method to do the spatial discretisation and we present the numerical solution obtained by these methods
Chebyshev collocation methods are high-order methods. This means that high precision is obtained wit...
Abstract: In the paper the adaptive grid method for numerical solution of one dimensional ...
We discuss the behavior of the minimal residual method applied to stabilized discretizations of one-...
Many physical problems involve diffusive and convective (transport) processes. When diffusion domina...
AbstractDifference methods for solving the convection-diffusion equation are discussed. The superior...
The numerical solution of convection-diffusion transport problems arises in many im
We are interested in the numerical solution of nonsymmetric linear systems arising from the discreti...
We study the Hermite collocation solution of the one-dimensional-steady-state convection-diffusion e...
A diffusion-convection equation is a partial differential equation featuring two important physical ...
We discuss the behavior of the minimal residual method applied to stabilized discretizations of one-...
The discretization of convection–diffusion equations by implicit or semi‐implicit methods leads to a...
A Shannon-Rugge-Kutta-Gill method for solving convection-diffusion equations is discussed. This appr...
Abstract-Tthis paper, is concerned with obtaining numerical solutions for a class of convection-diff...
The paper presents numerical analysis of finite difference schemes for solving the linear convection...
Convection-diffusion-reaction (CDR) equation plays a central role in many disciplines of engineering...
Chebyshev collocation methods are high-order methods. This means that high precision is obtained wit...
Abstract: In the paper the adaptive grid method for numerical solution of one dimensional ...
We discuss the behavior of the minimal residual method applied to stabilized discretizations of one-...
Many physical problems involve diffusive and convective (transport) processes. When diffusion domina...
AbstractDifference methods for solving the convection-diffusion equation are discussed. The superior...
The numerical solution of convection-diffusion transport problems arises in many im
We are interested in the numerical solution of nonsymmetric linear systems arising from the discreti...
We study the Hermite collocation solution of the one-dimensional-steady-state convection-diffusion e...
A diffusion-convection equation is a partial differential equation featuring two important physical ...
We discuss the behavior of the minimal residual method applied to stabilized discretizations of one-...
The discretization of convection–diffusion equations by implicit or semi‐implicit methods leads to a...
A Shannon-Rugge-Kutta-Gill method for solving convection-diffusion equations is discussed. This appr...
Abstract-Tthis paper, is concerned with obtaining numerical solutions for a class of convection-diff...
The paper presents numerical analysis of finite difference schemes for solving the linear convection...
Convection-diffusion-reaction (CDR) equation plays a central role in many disciplines of engineering...
Chebyshev collocation methods are high-order methods. This means that high precision is obtained wit...
Abstract: In the paper the adaptive grid method for numerical solution of one dimensional ...
We discuss the behavior of the minimal residual method applied to stabilized discretizations of one-...