| A numerical method based on Crank-Nicolson scheme for Burgers’ equation MK Kadalbajoo, A Awasthi Applied mathematics and computation 182 (2), 1430-1442, 2006 | 152 | 2006 |
| A systematic literature review of Burgers’ equation with recent advances MP Bonkile, A Awasthi, C Lakshmi, V Mukundan, VS Aswin Pramana 90, 1-21, 2018 | 132 | 2018 |
| A uniformly convergent B-spline collocation method on a nonuniform mesh for singularly perturbed one-dimensional time-dependent linear convection–diffusion problem MK Kadalbajoo, V Gupta, A Awasthi Journal of Computational and Applied Mathematics 220 (1-2), 271-289, 2008 | 81 | 2008 |
| A parameter-uniform implicit difference scheme for solving time-dependent Burgers’ equations MK Kadalbajoo, KK Sharma, A Awasthi Applied mathematics and computation 170 (2), 1365-1393, 2005 | 69 | 2005 |
| Efficient numerical techniques for Burgers’ equation V Mukundan, A Awasthi Applied Mathematics and Computation 262, 282-297, 2015 | 59 | 2015 |
| A numerical treatment of Fisher equation V Chandraker, A Awasthi, S Jayaraj Procedia Engineering 127, 1256-1262, 2015 | 47 | 2015 |
| A parameter uniform difference scheme for singularly perturbed parabolic problem in one space dimension MK Kadalbajoo, A Awasthi Applied mathematics and computation 183 (1), 42-60, 2006 | 45 | 2006 |
| A comparative study of numerical schemes for convection-diffusion equation VS Aswin, A Awasthi, C Anu Procedia Engineering 127, 621-627, 2015 | 39 | 2015 |
| Numerical treatment of Burger-Fisher equation V Chandraker, A Awasthi, S Jayaraj Procedia Technology 25, 1217-1225, 2016 | 35 | 2016 |
| A differential quadrature based numerical method for highly accurate solutions of Burgers' equation VS Aswin, A Awasthi, MM Rashidi Numerical Methods for Partial Differential Equations 33 (6), 2023-2042, 2017 | 30 | 2017 |
| Crank–nicolson finite difference method based on a midpoint upwind scheme on a non-uniform mesh for time-dependent singularly perturbed convection–diffusion equations MK Kadalbajoo, A Awasthi International Journal of Computer Mathematics 85 (5), 771-790, 2008 | 28 | 2008 |
| Exact solutions of the two-dimensional Burgers equation AM Wazwaz, M Hong-Cai, G Dong-Jie, Y Yao-Dong J. Phys. A: Math. Gen 32, 6897-6900, 1999 | 28 | 1999 |
| Linearized implicit numerical method for Burgers’ equation V Mukundan, A Awasthi Nonlinear Engineering 5 (4), 219-234, 2016 | 22 | 2016 |
| The midpoint upwind finite difference scheme for time-dependent singularly perturbed convection-diffusion equations on non-uniform mesh MK Kadalbajoo, A Awasthi International Journal for Computational Methods in Engineering Science and …, 2011 | 19 | 2011 |
| Quintic trigonometric spline based numerical scheme for nonlinear modified Burgers' equation L Chandrasekharan Nair, A Awasthi Numerical Methods for Partial Differential Equations 35 (3), 1269-1289, 2019 | 18 | 2019 |
| Robust numerical scheme for nonlinear modified Burgers equation C Lakshmi, A Awasthi International Journal of Computer Mathematics 95 (9), 1910-1926, 2018 | 15 | 2018 |
| An adaptive tailored finite point method for the generalized Burgers’ equations VP Shyaman, A Sreelakshmi, A Awasthi Journal of Computational Science 62, 101744, 2022 | 12 | 2022 |
| An accurate solution for the generalized Black-Scholes equations governing option pricing A Awasthi, TK Riyasudheen AIMS Mathematics 5 (3), 2226-2243, 2020 | 11 | 2020 |
| Iterative differential quadrature algorithms for modified Burgers equation A VS, A Awasthi Engineering Computations 35 (1), 235-250, 2018 | 11 | 2018 |
| Multistep methods for the numerical simulation of two-dimensional Burgers’ equation V Mukundan, A Awasthi, VS Aswin Differential Equations and Dynamical Systems, 1-24, 2019 | 10 | 2019 |
