| A modified fifth-order WENO scheme for hyperbolic conservation laws S Rathan, GN Raju Computers & Mathematics with Applications 75 (5), 1531-1549, 2018 | 72 | 2018 |
| Third‐order WENO scheme with a new smoothness indicator NR Gande, Y Rathod, S Rathan International Journal for Numerical Methods in Fluids 85 (2), 90–112, 2017 | 46 | 2017 |
| Simple smoothness indicator WENO-Z scheme for hyperbolic conservation laws S Rathan, NR Gande, AA Bhise Applied Numerical Mathematics 157, 255-275, 2020 | 24 | 2020 |
| Improved weighted ENO scheme based on parameters involved in nonlinear weights S Rathan, GN Raju Applied Mathematics and Computation 331, 120-129, 2018 | 24 | 2018 |
| An efficient hybrid WENO scheme with a problem independent discontinuity locator AA Bhise, G Naga Raju, R Samala, M Devakar International Journal for Numerical Methods in Fluids 91 (1), 1-28, 2019 | 22 | 2019 |
| L1-type smoothness indicators based WENO scheme for nonlinear degenerate parabolic equations S Rathan, R Kumar, AD Jagtap Applied Mathematics and Computation 375, 125112, 2020 | 18 | 2020 |
| An improved non-linear weights for seventh-order weighted essentially non-oscillatory scheme S Rathan, GN Raju Computers & Fluids 156, 496-514, 2017 | 18 | 2017 |
| Improved third order weighted essentially non‐oscillatory scheme NR Gande, Y Rathod, R Samala International Journal for Numerical Methods in Fluids 87 (7), 329-342, 2018 | 14 | 2018 |
| Numerical schemes for a class of nonlocal conservation laws: a general approach J Friedrich, S Sudha, S Rathan Networks and Heterogeneous Media 18 (3), 1335-1354, 2023 | 7 | 2023 |
| L 1‐type smoothness indicators based weighted essentially nonoscillatory scheme for Hamilton‐Jacobi equations S Rathan International Journal for Numerical Methods in Fluids 92 (12), 1927-1947, 2020 | 7 | 2020 |
| A sixth-order central WENO scheme for nonlinear degenerate parabolic equations S Rathan, J Gu Computational and Applied Mathematics 42 (182), 2023 | 6 | 2023 |
| Construction and Comparative Study of Second Order Time Stepping Methods Based on IQ and IMQ-RBFs S Rathan, D Shah International Journal of Applied and Computational Mathematics 8 (4), 203, 2022 | 2 | 2022 |
| Arc Length-Based WENO Scheme for Hamilton–Jacobi Equations R Samala, B Biswas Communications on Applied Mathematics and Computation 3 (3), 481-496, 2021 | 2 | 2021 |
| Exponential approximation space reconstruction weighted essentially nonoscillatory scheme for dispersive partial differential equations LV Salian, R Samala Mathematical Methods in the Applied Sciences 47 (4), 1823-1851, 2024 | 1 | 2024 |
| A novel central compact finite-difference scheme for third derivatives with high spectral resolution LV Salian, S Rathan, D Ghosh arXiv preprint arXiv:2405.00569, 2024 | | 2024 |
| Adaptive IQ and IMQ-RBFs for solving Initial Value Problems: Adam-Bashforth and Adam-Moulton methods S Rathan, D Shah, TH Kumar, KS Charan International Journal of Computational Methods 21 (03), 2350032, 2024 | | 2024 |
| High-order Shock Capturing Numerical Methods for Hyperbolic Conservation Laws S Rathan PhD Thesis, Visvesvaraya National Institute of Technology, Nagpur, 2018 | | 2018 |
| NPDE program MÉC MEC ISRO, 2016 | | 2016 |
| An Improved Non-linear Weights for Seventh-Order WENO Scheme S Rathan, GN Raju arXiv preprint arXiv:1611.06755, 2016 | | 2016 |
G Naga RajuProfessor of Mathematics, VNIT 在 mth.vnit.ac.in 的电子邮件经过验证
