Nodal integral expansion method for one-dimensional time-dependent linear convection–diffusion equation

We first describe a one-parameter family of unconditionally stable third-order timeintegration schemes for the convection-diffusion equation: ut + cux = vuxx, based on the extended trapezoidal formulas of Usmani and Agarwal [1]. Interestingly, there exists a method that is .fourth order as well as u

of the discretization is then minimized. This idea is called global discretisation where attention is no longer paid to The three-dimensional, time-dependent convection-diffusion equation (CDE) is considered. An exponential transformation is used the individual spatial and temporal derivatives but t

A stabilized ®nite element method for solving systems of convection±diusion-reaction equations is studied in this paper. The method is based on the subgrid scale approach and an algebraic approximation to the subscales. After presenting the formulation of the method, it is analyzed how it behaves un

This paper addresses the theoretical analysis of a fully discrete scheme for the one-dimensional time-dependent Schrödinger equation on unbounded domain. We first reduce the original problem into an initial-boundary value problem in a bounded domain by introducing a transparent boundary condition, t