Add to ORKGThe solution process for diffusion problems usually involves the time development separately from the space solution. A finite difference algorithm in time requires a sequential time development in which all previous values must be determined prior to the current value. The Stehfest Laplace transform algorithm, however, allows time solutions without the knowledge of prior values. It is of interest to be able to develop a time-domain decomposition suitable for implementation in a parallel environment. One such possibility is to use the Laplace transform to develop coarse-grained solutions which act as the initial values for a set of fine-grained solutions. The independence of the Laplace transform solutions means that we do indeed have a tim...
tended to solve linear wave equations. The time dependence of the problem is removed temporarily fro...
Discretization model is a continuous model transformation procedure to model discrete. Discretizatio...
This paper is focused on the accurate and efficient solution of partial differential differential eq...
AbstractA feasible method is presented for the numerical solution of a large class of linear partial...
In this thesis, a new numerical method, with the Laplace Transform and the Dual Reciprocity Method (...
AbstractThe solution of time-dependent partial differential equations using discrete (i.e. finite di...
We present the combined application of the dual reciprocity boundary element method (DRBEM) and the ...
This work considers a hybrid solution method for the time-fractional diffusion model with a cubic no...
We consider the discretization in time if a fractional order diffusion equation. The approximation i...
In this paper we consider numerical methods for integro-differential problems based on time discreti...
A fast numerical technique for the solution of partial differential equations describing timedepende...
Solute transport studies frequently rely on numerical solutions of the classical advection-diffusion...
Motivated by years of correspondence with Prof. Ralph White, I discuss two unconventional ways to so...
The time dependence of temperatures as solutions of transient heat conduction problems, may be obtai...
The integro-differential equation controlling transport and non-ideal sorption of a reactive contami...
tended to solve linear wave equations. The time dependence of the problem is removed temporarily fro...
Discretization model is a continuous model transformation procedure to model discrete. Discretizatio...
This paper is focused on the accurate and efficient solution of partial differential differential eq...
AbstractA feasible method is presented for the numerical solution of a large class of linear partial...
In this thesis, a new numerical method, with the Laplace Transform and the Dual Reciprocity Method (...
AbstractThe solution of time-dependent partial differential equations using discrete (i.e. finite di...
We present the combined application of the dual reciprocity boundary element method (DRBEM) and the ...
This work considers a hybrid solution method for the time-fractional diffusion model with a cubic no...
We consider the discretization in time if a fractional order diffusion equation. The approximation i...
In this paper we consider numerical methods for integro-differential problems based on time discreti...
A fast numerical technique for the solution of partial differential equations describing timedepende...
Solute transport studies frequently rely on numerical solutions of the classical advection-diffusion...
Motivated by years of correspondence with Prof. Ralph White, I discuss two unconventional ways to so...
The time dependence of temperatures as solutions of transient heat conduction problems, may be obtai...
The integro-differential equation controlling transport and non-ideal sorption of a reactive contami...
tended to solve linear wave equations. The time dependence of the problem is removed temporarily fro...
Discretization model is a continuous model transformation procedure to model discrete. Discretizatio...
This paper is focused on the accurate and efficient solution of partial differential differential eq...