| A new high order compact off-step discretization for the system of 3D quasi-linear elliptic partial differential equations RK Mohanty, N Setia Applied Mathematical Modelling 37 (10-11), 6870-6883, 2013 | 26 | 2013 |
| A new compact high order off-step discretization for the system of 2D quasi-linear elliptic partial differential equations RK Mohanty, N Setia Advances in Difference Equations 2013 (1), 1-29, 2013 | 17 | 2013 |
| A new fourth-order compact off-step discretization for the system of 2D nonlinear elliptic partial differential equations RK Mohanty, N Setia East Asian Journal on Applied Mathematics 2 (1), 59-82, 2012 | 11 | 2012 |
| A new high accuracy two-level implicit off-step discretization for the system of two space dimensional quasi-linear parabolic partial differential equations RK Mohanty, N Setia Applied Mathematics and Computation 219 (5), 2680-2697, 2012 | 10 | 2012 |
| A third-order finite difference method on a quasi-variable mesh for nonlinear two point boundary value problems with Robin boundary conditions N Setia, RK Mohanty Soft Computing 25 (20), 12775-12788, 2021 | 6 | 2021 |
| A new high accuracy two-level implicit off-step discretization for the system of three space dimensional quasi-linear parabolic partial differential equations RK Mohanty, N Setia Computers & Mathematics with Applications 69 (10), 1096-1113, 2015 | 5 | 2015 |
| High precision compact numerical approximation in exponential form for the system of 2D quasilinear elliptic BVPs on a discrete irrational region RK Mohanty, N Setia, G Khurana, G Manchanda MethodsX 9, 101790, 2022 | 4 | 2022 |
| A NEW HIGH ACCURACY VARIABLE MESH DISCRETIZATION FOR THE SOLUTION OF THE SYSTEM OF 2 D NON-LINEAR ELLIPTIC BOUNDARY VALUE PROBLEMS N Setia, RK Mohanty Neural Parallel and Scientific Computations 20 (3), 415, 2012 | 4 | 2012 |
| A high accuracy variable mesh numerical approximation for two point nonlinear BVPs with mixed boundary conditions N Setia, RK Mohanty Soft Computing 26 (19), 9805-9821, 2022 | 3 | 2022 |
| A New Compact Off-Step Discretization for the System of 2D Quasi-Linear Elliptic Equations on Unequal Mesh RK Mohanty, N Setia Computational Mathematics and Modeling 25 (3), 381-403, 2014 | 3 | 2014 |
| Higher order approximation in exponential form based on half-step grid-points for 2D quasilinear elliptic BVPs on a variant domain N Setia, RK Mohanty MethodsX, 101980, 2023 | 2 | 2023 |
| A class of quasi-variable mesh methods based on off-step discretization for the solution of non-linear fourth order ordinary differential equations with Dirichlet and Neumann … RK Mohanty, MH Sarwer, N Setia Advances in Difference Equations 2016 (1), 1-27, 2016 | 1 | 2016 |
| Cubic spline approximation based on half-step discretization for 2D quasilinear elliptic equations RK Mohanty, R Kumar, N Setia International Journal for Computational Methods in Engineering Science and …, 2020 | | 2020 |
| High accuracy off step discretizations for the system of multi dimensional quasi lineal elliptic and parabolic partial differential N Setia New Delhi, 0 | | |
Ranjan Kumar MohantySouth Asian UniversityVerified email at sau.ac.in
