Special Session 135: Latest Developments in Computational Methods for Differential Equations Arising in Fluid Dynamics with Multi-scale and Boundary Layer Behaviour

Layer-Resolving Numerical Methods for Degenerate Singular Perturbations Problems with Two Parameters
Anirban Majumdar
Indian Institute of Information Technology Design and Manufacturing Kurnool
India
Co-Author(s):    Mrityunjoy Barman, Natesan Srinivasan, Anirban Majumdar
Abstract:
This work addresses a class of steady-state and time-dependent degenerate singular perturbation problems with two parameters affecting the convection and diffusion terms. Due to the presence of degeneracy and multiple perturbation parameters, the continuous solution exhibits boundary layers with different widths at the boundaries of the spatial domain. To effectively capture these layers, we utilize a piecewise uniform Shishkin grid for spatial discretization and a uniform grid for time discretization. The time derivative is approximated using an implicit Euler method on the equispaced temporal grid, while upwind finite difference schemes are applied to the Shishkin mesh for spatial derivatives. To enhance solution accuracy, we incorporate the Richardson extrapolation technique. Our theoretical analysis establishes an error bound, demonstrating almost second-order convergence. Numerical experiments are conducted to corroborate the theoretical findings, confirming the predicted convergence rates.