Aswin V S

1. Aswin, V. S., & Awasthi, A. (2025). A Study on Time-Dependent Two Parameter Singularly Perturbed Problems via Trigonometric Quintic B-Splines on an Exponentially Graded Mesh. International Journal for Numerical Methods in Engineering, 126(19).

2. Sangeetha, C., Aswin, V. S., & Awasthi, A. (2025). Numerical solution of time-dependent two-parameter singularly perturbed problems via Trigonometric Quintic B-spline collocation technique. Physica Scripta, 100(1), 015206.

3. Aswin, V. S., Manimaran, J., & Chamakuri, N. (2023). Space-time adaptivity for a multi-scale cancer invasion model. Computers & Mathematics with Applications, 146, 309–322.

4. Aswin, V. S., TK, R., & Awasthi, A. (2023). Differential quadrature parallel algorithms for solving systems of convection-diffusion and reaction models. Numerical Algorithms, 93(1), 321–346.

5. Mukundan, V., Awasthi, A., & Aswin, V. S. (2022). Multistep methods for the numerical simulation of two-dimensional Burgers’ equation. Differential Equations and Dynamical Systems, 30(4), 909–932.

6. Aswin, V. S., & Awasthi, A. (2021). Systematic formulation of a general numerical framework for solving the two-dimensional convection–diffusion–reaction system. International Journal of Nonlinear Sciences and Numerical Simulation, 22(7–8), 843–859.

7. Aswin, V. S., & Awasthi, A. (2019). A robust numerical scheme for the simulation of nonlinear convection–diffusion–reaction equation. International Journal for Computational Methods in Engineering Science and Mechanics, 20(5), 347–357.

8. Bonkile, M. P., Awasthi, A., Lakshmi, C., Mukundan, V., & Aswin, V. S. (2018). A systematic literature review of Burgers’ equation with recent advances. Pramana, 90(6), 69.

9. Aswin, V. S., & Awasthi, A. (2018). Iterative differential quadrature algorithms for modified Burgers equation. Engineering Computations, 35(1), 235–250.

10. Aswin, V. S., & Awasthi, A. (2017). Polynomial based differential quadrature methods for the numerical solution of Fisher and extended Fisher–Kolmogorov equations. International Journal of Applied and Computational Mathematics, 3(1), 665–677.

11. Aswin, V. S., Awasthi, A., & Rashidi, M. M. (2017). A differential quadrature based numerical method for highly accurate solutions of Burgers’ equation. Numerical Methods for Partial Differential Equations, 33(6), 2023–2042.

12. Aswin, V. S., Awasthi, A., & Anu, C. (2015). A comparative study of numerical schemes for convection-diffusion equation. Procedia Engineering, 127, 621–627.