A hybrid numerical scheme for singularly perturbed parabolic differential‐difference equations arising in the modeling of neuronal variability

Abstract: This study aims at constructing a robust numerical scheme for solving singularly perturbed parabolic delay differential equations arising in the modeling of neuronal variability. Taylor's series expansion is applied to approximate the shift terms. The obtained result is approximated by using the implicit Euler method in the temporal discretization on a uniform step size with the hybrid numerical scheme consisting of the midpoint upwind method in the outer layer region and the cubic spline in tension method in … Show more

“…Chakravarthy et al [ 8 ] treated a singular perturbation problem with delay by formulating a scheme using cubic spline in compression on a uniform mesh. Daba and Duressa [ 9 ] solved singularly perturbed problems by formulating a hybrid numerical scheme on a piece-wise uniform spatial meshes. Bansal and Sharma [ 10 ] solved singularly perturbed problems involving large delay by formulating a numerical method applying implicit Euler method in time variable and central difference method in space variable with piece-wise uniform meshes.…”

A tension spline fitted numerical scheme for singularly perturbed reaction-diffusion problem with negative shift

“…Chakravarthy et al [ 8 ] treated a singular perturbation problem with delay by formulating a scheme using cubic spline in compression on a uniform mesh. Daba and Duressa [ 9 ] solved singularly perturbed problems by formulating a hybrid numerical scheme on a piece-wise uniform spatial meshes. Bansal and Sharma [ 10 ] solved singularly perturbed problems involving large delay by formulating a numerical method applying implicit Euler method in time variable and central difference method in space variable with piece-wise uniform meshes.…”

A tension spline fitted numerical scheme for singularly perturbed reaction-diffusion problem with negative shift

Uniform Convergent Solution of Singularly Perturbed Parabolic Differential Equations with General Temporal-Lag

Hybrid method for singularly perturbed Robin type parabolic convection–diffusion problems on Shishkin mesh