Application of Euler Method to Singular Perturbation Problems
Application of Euler’s forward method for the numerical solution of singularly perturbed differential equation is presented. Stability region and order finger star are provided to show the order of convergence. The rate of theoretical and numerical order of convergence is derived. Experimental results are presented to show the performance of the method both numerically and graphically, based on the metrices such as amplification factor, stability function, stability region and theoretical and numerical rate of order of convergence.
Singular perturbation problems, Eulerâ€™s method, Stability region, Order star finger, Amplification factor.