In this article, we propose a parameter-uniform computational technique to solve singularly perturbed delay parabolic initial-boundary-value problems exhibiting parabolic boundary layers. The domain is discretized by a uniform mesh in the time direction and a nonuniform mesh for the spatial variable obtained via the equidistribution of a monitor function. The numerical scheme consists of the implicit Euler scheme for the time derivative and the classical central difference scheme for the spatial derivative. A truncation error analysis and a stability analysis are carried out. It is shown that the method converges uniformly in the discrete supremum norm with an optimal error bound. Error estimates are derived, and numerical examples are presented.

• 出版日期2014