| A tenth order A-stable two-step hybrid block method for solving initial value problems of ODEs H Ramos, G Singh Applied Mathematics and Computation 310, 75-88, 2017 | 36 | 2017 |
| An efficient optimized adaptive step-size hybrid block method for integrating differential systems G Singh, A Garg, V Kanwar, H Ramos Applied Mathematics and Computation 362, 0 | 35* | |
| An optimized two-step hybrid block method formulated in variable step-size mode for integrating y''=f(x,y,y') numerically G Singh, H Ramos Numerical Mathematics: Theory, Methods and Applications, 2018 | 30 | 2018 |
| An efficient variable step-size rational Falkner-type method for solving the special second-order IVP H Ramos, G Singh, V Kanwar, S Bhatia Applied Mathematics and Computation 291, 39-51, 2016 | 26 | 2016 |
| A note on variable step-size formulation of a Simpson’s-type second derivative block method for solving stiff systems H Ramos, G Singh Applied Mathematics Letters 64, 101-107, 2017 | 25 | 2017 |
| An embedded 3 (2) pair of nonlinear methods for solving first order initial-value ordinary differential systems H Ramos, G Singh, V Kanwar, S Bhatia Numerical Algorithms 75, 509-529, 2017 | 14 | 2017 |
| Solving first-order initial-value problems by using an explicit non-standard A-stable one-step method in variable step-size formulation H Ramos, G Singh, V Kanwar, S Bhatia Applied Mathematics and Computation 268, 796-805, 2015 | 12 | 2015 |
| Efficient adaptive step-size formulation of an optimized two-step hybrid block method for directly solving general second-order initial-value problems R Singla, G Singh, V Kanwar, H Ramos Computational and Applied Mathematics 40 (6), 220, 2021 | 9 | 2021 |
| Solving second order two-point boundary value problems accurately by a third derivative hybrid block integrator H Ramos, G Singh Applied Mathematics and Computation 421, 2022 | 7 | 2022 |
| A novel two‐parameter class of optimized hybrid block methods for integrating differential systems numerically G Singh, A Garg, R Singla, V Kanwar Computational and Mathematical Methods 3 (6), e1214, 2021 | 7 | 2021 |
| A High-Order Efficient Optimised Global Hybrid Method for Singular Two-Point Boundary Value Problems H Ramos, G Singh East Asian Journal on Applied Mathematics 11 (3), 515-539, 2021 | 6 | 2021 |
| Exponentially Fitted Variants of the Two-Step Adams-Bashforth Method for the Numerical Integration of Initial Value Problems G Singh, V Kanwar, S Bhatia Applications and Applied Mathematics: An International Journal (AAM) 8 (2 …, 2013 | 6 | 2013 |
| Explicit solutions of the singular Yang–Baxter-like matrix equation and their numerical computation A Kumar, JR Cardoso, G Singh Mediterranean Journal of Mathematics 19 (2), 85, 2022 | 3 | 2022 |
| An efficient optimized adaptive step-size hybrid block method for integrating w′′= f (t, w, w′) directly R Singla, G Singh, H Ramos, V Kanwar Journal of Computational and Applied Mathematics 420, 114838, 2023 | 2 | 2023 |
| Numerical solution of time dependent nonlinear partial differential equations using a novel block method coupled with compact finite difference schemes A Mehta, G Singh, H Ramos Computational and Applied Mathematics 42 (4), 201, 2023 | 1 | 2023 |
| Solving one-dimensional third order nonlinear KdV equation using MacCormack method coupled with compact finite difference scheme A Mehta, G Singh AIP Conference Proceedings 2451 (1), 2022 | 1 | 2022 |
| Seventh order a-stable optimized hybrid block method using adaptive step-size for solving differential systems R Singla, G Singh, V Kanwar AIP Conference Proceedings 2451 (1), 2022 | | 2022 |
| An Adaptive Step-Size Optimized Seventh-Order Hybrid Block Method for Integrating Differential Systems Efficiently R Singla, G Singh, V Kanwar International Conference on Frontiers in Industrial and Applied, 495-508, 2021 | | 2021 |
HIGINIO RAMOSUniversidad de SalamancaDirección de correo verificada de usal.es
