A numerical method is presented to solve a two-dimensional hyperbolic diffusion problem where is assumed that both convection and diffusion are responsible for flow motion. Since direct solutions based on implicit schemes for multidimensional problems are computationally inefficient, we apply an alternating direction method which is second order accurate in time and space. The stability of the alternating direction method is analyzed using the energy method. Numerical results are presented to illustrate the performance in different cases
AbstractA new strategy for solving second-order hyperbolic partial differential equations using asym...
We present a family of schemes for the approximation of one dimensional convection-diffusion equatio...
A class of convection-diffusion parabolic boundary value problems is considered in this study. When ...
A numerical method is presented to solve a two-dimensional hyperbolic diffusion problem where is ass...
Second order hyperbolic differential equations have been used to model many problems that appear rel...
Alternating-Direction Explicit (A.D.E.) finite-difference methods make use of two approximations tha...
Alternating-Direction Explicit (A.D.E.) finite-difference methods make use of two approximations tha...
AbstractNonclassical parabolic initial-boundary value problems arise in the study of several importa...
Two different finite difference schemes for solving the two-dimensional parabolic inverse problem wi...
An unconditionally stable alternating direction explicit scheme (ADE) to solve the one-dimensional u...
Abstract: Based on the concept of alternating group and domain decomposition, we present a class of ...
International audienceWe propose an asymptotic preserving (AP) Implicit-Explicit (ImEx) scheme for t...
Abstract: Two implicit algorithms are developed and realized in X-Y geometry for solving s...
Abstract According to the principle of conservation of mass and the fractional Fick’s law, a new two...
Many physical problems involve diffusive and convective (transport) processes. When diffusion domina...
AbstractA new strategy for solving second-order hyperbolic partial differential equations using asym...
We present a family of schemes for the approximation of one dimensional convection-diffusion equatio...
A class of convection-diffusion parabolic boundary value problems is considered in this study. When ...
A numerical method is presented to solve a two-dimensional hyperbolic diffusion problem where is ass...
Second order hyperbolic differential equations have been used to model many problems that appear rel...
Alternating-Direction Explicit (A.D.E.) finite-difference methods make use of two approximations tha...
Alternating-Direction Explicit (A.D.E.) finite-difference methods make use of two approximations tha...
AbstractNonclassical parabolic initial-boundary value problems arise in the study of several importa...
Two different finite difference schemes for solving the two-dimensional parabolic inverse problem wi...
An unconditionally stable alternating direction explicit scheme (ADE) to solve the one-dimensional u...
Abstract: Based on the concept of alternating group and domain decomposition, we present a class of ...
International audienceWe propose an asymptotic preserving (AP) Implicit-Explicit (ImEx) scheme for t...
Abstract: Two implicit algorithms are developed and realized in X-Y geometry for solving s...
Abstract According to the principle of conservation of mass and the fractional Fick’s law, a new two...
Many physical problems involve diffusive and convective (transport) processes. When diffusion domina...
AbstractA new strategy for solving second-order hyperbolic partial differential equations using asym...
We present a family of schemes for the approximation of one dimensional convection-diffusion equatio...
A class of convection-diffusion parabolic boundary value problems is considered in this study. When ...