A fractional predator-prey model and its solution S Das, PK Gupta, Rajeev International Journal of Nonlinear Sciences and Numerical Simulation 10 (7 …, 2009 | 67 | 2009 |
Homotopy perturbation method for a limit case Stefan problem governed by fractional diffusion equation Rajeev, MS Kushwaha Applied Mathematical Modelling 37 (5), 3589-3599, 2013 | 41 | 2013 |
A Stefan problem with variable thermal coefficients and moving phase change material AK Singh, A Kumar, Rajeev Journal of King Saud University – Science 31 (4), 1064-1069, 2019 | 36 | 2019 |
A Stefan problem with temperature and time dependent thermal conductivity A Kumar, AK Singh, Rajeev Journal of King Saud University – Science 32, 97–101, 2020 | 35 | 2020 |
A Stefan problem with moving phase change material, variable thermal conductivity and periodic boundary condition A Kumar, Rajeev Applied Mathematics and Computation 386, 125490, 2020 | 34 | 2020 |
Finite difference/collocation method to solve multi term variable‐order fractional reaction–advection–diffusion equation in heterogeneous medium KD Dwivedi, Rajeev, S Das, JFG Aguilar Numerical Methods for Partial Differential Equations 37 (3), 2031-2045, 2021 | 31 | 2021 |
A moving boundary problem with variable specific heat and thermal conductivity A Kumar, AK Singh, Rajeev Journal of King Saud University – Science 32, 384–389, 2020 | 29 | 2020 |
Numerical solution of a moving-boundary problem with variable latent heat Rajeev, KN Rai, S Das International Journal of Heat and Mass Transfer 52 (7-8), 1913-1917, 2009 | 28 | 2009 |
A study of fractional order dual-phase-lag bioheat transfer model M Kumar, KN Rai, Rajeev Journal of Thermal Biology 93, 102661, 2020 | 21 | 2020 |
Numerical Solution of Nonlinear Space–Time Fractional-Order Advection–Reaction–Diffusion Equation KD Dwivedi, Rajeev, S Das, D Baleanu Journal of Computational and Nonlinear Dynamics 15 (6), 061005, 2020 | 17 | 2020 |
A moving boundary problem with space-fractional diffusion logistic population model and density-dependent dispersal rate A Kumar, Rajeev Applied Mathematical Modelling 88, 951–965, 2020 | 16 | 2020 |
An approximate solution to a moving boundary problem with space–time fractional derivative in fluvio-deltaic sedimentation process Rajeev, MS Kushwaha, A Kumar Ain Shams Engineering Journal 4 (4), 889-895, 2013 | 16 | 2013 |
Solution of fractional diffusion equation with a moving boundary condition by variational iteration method and Adomian decomposition method S Das, Rajeev Zeitschrift für Naturforschung A 65 (10), 793-799, 2010 | 15 | 2010 |
Quasi-projective synchronization of inertial complex-valued recurrent neural networks with mixed time-varying delay and mismatched parameters A Kumar, S Das, S Singh, Rajeev Chaos, Solitons and Fractals 166, 2023 | 13 | 2023 |
Global quasi-synchronization of complex-valued recurrent neural networks with time-varying delay and interaction terms A Kumar, S Das, VK Yadav, Rajeev Chaos, Solitons and Fractals 152, 111323, 2021 | 13 | 2021 |
Exact and approximate solutions of a phase change problem with moving phase change material and variable thermal coefficients AK Singh, A Kumar, Rajeev Journal of King Saud University – Science 31 (4), 1318-1325, 2019 | 13 | 2019 |
A numerical study for inward solidification of a liquid contained in cylindrical and spherical vessel Rajeev, S Das Thermal Science 14 (2), 365-372, 2010 | 13* | 2010 |
Solution of one-dimensional moving boundary problem with periodic boundary conditions by variational iteration method Rajeev, KN Rai, S Das Thermal Science 13 (2), 199-204, 2009 | 13 | 2009 |
Homotopy analysis method for a fractional Stefan problem Rajeev, AK Singh Nonlinear Science Letter A 8, 50-59, 2017 | 12 | 2017 |
Global exponential synchronization of complex-valued recurrent neural networks in presence of uncertainty along with time-varying bounded and unbounded delay terms A Kumar, S Das, Rajeev, VK Yadav International Journal of Dynamics and Control, 2021 | 10 | 2021 |