A fractional epidemiological model for computer viruses pertaining to a new fractional derivative J Singh, D Kumar, Z Hammouch, A Atangana Applied Mathematics and Computation 316, 504-515, 2018 | 546 | 2018 |
An efficient analytical technique for fractional model of vibration equation HM Srivastava, D Kumar, J Singh Applied Mathematical Modelling 45, 192-204, 2017 | 239 | 2017 |
On the analysis of vibration equation involving a fractional derivative with Mittag‐Leffler law D Kumar, J Singh, D Baleanu Mathematical Methods in the Applied Sciences, 2019 | 235 | 2019 |
A new fractional exothermic reactions model having constant heat source in porous media with power, exponential and Mittag-Leffler laws D Kumar, J Singh, K Tanwar, D Baleanu International Journal of Heat and Mass Transfer 138, 1222-1227, 2019 | 225 | 2019 |
Analysis of regularized long-wave equation associated with a new fractional operator with Mittag-Leffler type kernel D Kumar, J Singh, D Baleanu Physica A: Statistical Mechanics and its Applications 492, 155-167, 2018 | 222 | 2018 |
An efficient numerical method for fractional SIR epidemic model of infectious disease by using Bernstein wavelets S Kumar, A Ahmadian, R Kumar, D Kumar, J Singh, D Baleanu, M Salimi Mathematics 8 (4), 558, 2020 | 199 | 2020 |
An efficient analytical approach for fractional equal width equations describing hydro-magnetic waves in cold plasma A Goswami, J Singh, D Kumar, Sushila Physica A: Statistical Mechanics and its Applications, 2019 | 198 | 2019 |
A new fractional SIRS-SI malaria disease model with application of vaccines, antimalarial drugs, and spraying D Kumar, J Singh, M Al Qurashi, D Baleanu Advances in Difference Equations 2019 (1), 1-19, 2019 | 193 | 2019 |
A modified numerical scheme and convergence analysis for fractional model of Lienard’s equation D Kumar, RP Agarwal, J Singh Journal of Computational and Applied Mathematics 339, 405-413, 2018 | 181 | 2018 |
A new fractional model for giving up smoking dynamics J Singh, D Kumar, MA Qurashi, D Baleanu Advances in Difference Equations 2017 (1), 1-16, 2017 | 178 | 2017 |
Numerical solution of time-and space-fractional coupled Burgers’ equations via homotopy algorithm J Singh, D Kumar, R Swroop Alexandria Engineering Journal 55 (2), 1753-1763, 2016 | 175 | 2016 |
An efficient numerical algorithm for the fractional Drinfeld–Sokolov–Wilson equation J Singh, D Kumar, D Baleanu, S Rathore Applied Mathematics and Computation 335, 12-24, 2018 | 164 | 2018 |
New aspects of fractional Biswas–Milovic model with Mittag-Leffler law J Singh, D Kumar, D Baleanu Mathematical Modelling of Natural Phenomena 14 (3), 303, 2019 | 155 | 2019 |
Homotopy perturbation Sumudu transform method for nonlinear equations J Singh, D Kumar Advances in Applied Mathematics and Mechanics 4, 165-175, 2011 | 151 | 2011 |
On the analysis of fractional diabetes model with exponential law J Singh, D Kumar, D Baleanu Advances in Difference Equations 2018 (1), 1-15, 2018 | 149 | 2018 |
A new numerical algorithm for fractional Fitzhugh–Nagumo equation arising in transmission of nerve impulses D Kumar, J Singh, D Baleanu Nonlinear Dynamics 91 (1), 307-317, 2018 | 148 | 2018 |
A new analysis for fractional model of regularized long‐wave equation arising in ion acoustic plasma waves D Kumar, J Singh, D Baleanu Mathematical Methods in the Applied Sciences 40 (15), 5642-5653, 2017 | 137 | 2017 |
On the analysis of chemical kinetics system pertaining to a fractional derivative with Mittag-Leffler type kernel J Singh, D Kumar, D Baleanu Chaos: An Interdisciplinary Journal of Nonlinear Science 27 (10), 103113, 2017 | 136 | 2017 |
A hybrid computational approach for Klein–Gordon equations on Cantor sets D Kumar, J Singh, D Baleanu Nonlinear Dynamics 87 (1), 511-517, 2017 | 135 | 2017 |
Reproducing kernel approach for numerical solutions of fuzzy fractional initial value problems under the Mittag–Leffler kernel differential operator O Abu Arqub, J Singh, B Maayah, M Alhodaly Mathematical Methods in the Applied Sciences, 2021 | 133 | 2021 |