Collection's Items (Sorted by Submit Date in Descending order): 841 to 860 of 870
| Issue Date | Title | Author(s) |
| 2018-02 | A parameter-uniform numerical scheme for the parabolic singularly perturbed initial boundary value problems with large time delay | Kumar, Devendra |
| 2018-04 | An implicit scheme for singularly perturbed parabolic problem with retarded terms arising in computational neuroscience | Kumar, Devendra |
| 2018-06 | A collocation method for singularly perturbed differential-difference turning point problems exhibiting boundary/interior layers | Kumar, Devendra |
| 2015 | Fitted Mesh Method for a Class of Singularly Perturbed Differential-Difference Equations | Kumar, Devendra |
| 2013 | A parameter uniform method for singularly perturbed differential-difference equations with small shifts | Kumar, Devendra |
| 2011-06 | A parameter-uniform numerical method for time-dependent singularly perturbed differential-difference equations | Kumar, Devendra |
| 2010-09 | A computational method for singularly perturbed nonlinear differential-difference equations with small shift | Kumar, Devendra |
| 2008-10 | Comparative study of singularly perturbed two-point BVPs via: Fitted-mesh finite difference method, B-spline collocation method and finite element method | Kumar, Devendra |
| 2008-10 | Fitted mesh B-spline collocation method for singularly perturbed differential–difference equations with small delay | Kumar, Devendra |
| 2008-08 | A non-linear single step explicit scheme for non-linear two-point singularly perturbed boundary value problems via initial value technique | Kumar, Devendra |
| 2008 | Parameter-uniform fitted operator B-spline collocation method for self-adjoint singularly perturbed two-point boundary value problems | Kumar, Devendra |
| 2007-07 | Geometric mesh FDM for self-adjoint singular perturbation boundary value problems | Kumar, Devendra |
| 2022-08 | Spline-based parameter-uniform scheme for fourth-order singularly perturbed differential equations | Kumar, Devendra |
| 2022-10 | An effective numerical approach for two parameter time-delayed singularly perturbed problems | Kumar, Devendra |
| 2022-10 | Wavelet-based approximation with nonstandard finite difference scheme for singularly perturbed partial integrodifferential equations | Kumar, Devendra |
| 2022-03 | A second-order numerical scheme for the time-fractional partial differential equations with a time delay | Kumar, Devendra |
| 2023-01 | An efficient numerical technique for two-parameter singularly perturbed problems having discontinuity in convection coefficient and source term | Kumar, Devendra |
| 2022-10 | Second-order convergent scheme for time-fractional partial differential equations with a delay in time | Kumar, Devendra |
| 2023 | A semi-analytic method for solving singularly perturbed twin-layer problems with a turning point | Kumar, Devendra |
| 2023-04 | Uniformly convergent scheme for fourth-order singularly perturbed convection-diffusion ODE | Kumar, Devendra |
Collection's Items (Sorted by Submit Date in Descending order): 841 to 860 of 870
