1. Navnit Jha, I. Perfilieva, Kritika, Order-preserving fuzzy transform for singular boundary value problems of polytropic gas flow and sewage diffusion, Fuzzy Sets and Systems 475 (2024) 108748
2. Navnit Jha, I. Perfilieva, Kritika, Fuzzy transform algorithm based on high-resolution compact discretization for three-dimensional nonlinear elliptic PDEs and convection–diffusion equations, Soft Computing, 2023, doi.org/10.1007/s00
500-023-09146-0
3. Navnit Jha, Shikha Verma, Infinitely smooth multiquadric RBFs combined high-resolution compact discretization for non- linear 2D elliptic PDEs on a scattered grid network, Computational Methods for Differential Equations 11(4) (2023) 753-775
4. Navnit Jha, Irina Perfilieva, Kritika, A high-resolution fuzzy transform combined compact scheme for 2D nonlinear elliptic partial differential equations, MethodsX 10(102206) (2023) 1-22.
5. Navnit Jha, Kritika, Exponential Basis Approximated Fuzzy Components High‐Resolution Compact Discretization Technique for 2D Convection–Diffusion Equations, Differential Equations and Dynamical Systems (2022), 1-25.
6. Navnit Jha, Numerical treatment of fractal boundary value problems for heat conduction in polar bear with spatial variation of thermal conductivity, Examples and Counterexamples 2 (2022) 100088, 1-4
7. Navnit Jha, Shikha Verma, A High-Resolution Convergent Radial Basis Functions Compact-FDD for Boundary Layer Problems on a Scattered Mesh Network Appearing in Viscous Elastic Fluid, Int. J. Appl. Comput. Math (2022) 8:244, 1-27
8. Navnit Jha, Shikha Verma, Method of approximations for the convection-dominated anomalous diffusion equation in a rectangular plate using high-resolution compact discretization, MethodsX 9 (2022) 101853, 1-23
9. Navnit Jha, Ping Lin, Digital Simulations for Three-dimensional Nonlinear Advection- diffusion Equations Using Quasi-variable Meshes High-resolution Implicit Compact Scheme, Research Reports on Computer Science, 1(2022) 85-110.
10. Navnit Jha, S. Verma, Approximate analytic solution for human head heat distribution and tumor growth physiological model using radial basis network three-point discretization, J. Innovation Sciences and Sustainable Technologies, 2(3)(2022), 147-163.Navnit Jha, Madhav Wagley, Spline-in-compression and geometric meshes non-standard finite-difference compact discretization for solving Burgers type nonlinear parabolic PDEs, Mathematics in Engineering, Science and Aerospace, 13(4) (2022) 965-991.
11. Navnit Jha, I. Perfilieva, Kritika, High-resolution fuzzy component scheme for second-order differential equation appearing in single commodity stochastic production planning, Journal of Innovation Sciences and Sustainable Technologies, 1(3)(2021), 205 – 220
12. Navnit Jha, Kritika, Approximate analytic solution for tumour growth and human head heat distribution singular boundary value model by high-resolution order-preserving fuzzy transform, Computational and Analytic Methods in Biological Sciences, Bioinformatics with Machine Learning and Mathematical Modelling, River Publishers Series in Biomedical Engineering, 2022.
13. Navnit Jha, M. Wagley, Stability Analysis of Quasi-variable Grids Cubic Spline Fourth-Order Compact Implicit Algorithms for Burger’s Type Parabolic PDEs, Iran J Sci Technol Trans Sci (2020) 44:1875–1890
14. Navnit Jha, M. Wagley, A Family of Variable Step-size Meshes Fourth-order Compact Numerical Scheme for (2+1)-dimensions Burger’s-Huxley, Burger’s-Fisher and Convection-diffusion Equations, Journal of Nonlinear Modeling and Analysis, 4(2), 2022, 245–276
15. A.K. Misra, R. Patel, Navnit Jha, Modeling the effects of insecticides and external efforts on crop production, Nonlinear Analysis: Modelling and Control, 26(6), (2021) 1012–1030
16. Navnit Jha, Impact of Quasi-Variable Nodes on Numerical Integration of Parameter-Dependent Functions: A Maple Suite, Intelligent Learning for Computer Vision, Springer, Singapore, 61:455-462, (2021)
17. Navnit Jha, M. Wagley, Numerical algorithm for coupled viscous Burgers equation using quasi-variable meshes compact operators, Azerbaijan Journal of Mathematics, 2021, 144-155
18. Navnit Jha, M. Wagley, A family of quasi-variable meshes high-resolution compact operator scheme for Burger’s-Huxley and Burger’s-Fisher equation, Mathematics in Applied Sciences and Engineering, 1(4) 286-308 (2020)
19. Navnit Jha, B. Singh, Fourth-order compact scheme based on quasi-variable mesh for three-dimensional mildly nonlinear stationary convection-diffusion equations, Numer Methods Partial Differential Equations 2020, 1-27.
20. A. K. Misra, Navnit Jha, R. Patel, Modeling the Effects of Insects and Insecticides with External Efforts on Agricultural Crops, Differential Equations and Dynamical Systems, 2020, https://doi.org/10.1007/s12591-020-00555-3
21. Navnit Jha, S. Perera, Editorial, Special issue on Computational Modeling & Simulations-Real World Applications, Differential Equations and Dynamical Systems, Springer, 2020, https://doi.org/10.1007/s12591-020-00540-w
22. A.K. Misra, Navnit Jha, R. Patel, Modeling the effects of insects and insecticides on agricultural crops with NSFD method, Journal of Applied Mathematics and Computing, 63, 197-215 (2020)
23. Navnit Jha, B. Singh, Exponential basis and exponential expanding grids third (fourth)-order compact schemes for nonlinear three-dimensional convection-diffusion-reaction equation, Advances in Difference Equations 339, 1-27 (2019).
24. Navnit Jha, V. Gopal, B. Singh, A Third-Order Accurate Finite Difference Method and Compact Operator Approach for Mildly Nonlinear Two Spatial Dimensions Elliptic BVPs with Integral Form of Source Term, Soft Computing for Problem Solving, Springer, 2019, 893-912.
25. Navnit Jha, V. Gopal, B. Singh, Geometric grid network and third-order compact scheme for solving nonlinear variable coefficients 3D elliptic PDEs, International Journal of Modeling, Simulation, and Scientific Computing, 9, 1-28 (2018).
26. Navnit Jha, V. Gopal, B. Singh, A family of compact finite difference formulations for three-space dimensional nonlinear Poisson's equations in Cartesian coordinates, Differential Equations and Dynamical Systems, 26, 105-123 (2018).
27. Navnit Jha, V. Gopal, B. Singh, A third-order accurate finite difference method and compact operator approach for mildly nonlinear two-spatial dimensions elliptic BVPs with integral form of source term, Soft Computing for Problem Solving, Advances in Intelligent Systems and Computing, Springer, 817, 893-912 (2018).
28. Navnit Jha, N. Kumar, A fourth-order accurate quasi-variable meshes compact finite-difference scheme for two-space dimensions convection-diffusion problems, Advances in Difference Equations, 64, 1-13 (2017).
29. Navnit Jha, N. Kumar, K. K. Sharma, A third (four) order accurate, nine-point compact Scheme for mildly-nonlinear elliptic equations in two space variables, Differential Equations and Dynamical Systems, 25(2), 223-237 (2017).
