| Mathematical model for coronavirus disease 2019 (COVID‐19) containing isolation class A Zeb, E Alzahrani, VS Erturk, G Zaman BioMed research international 2020 (1), 3452402, 2020 | 298 | 2020 |
| Dynamics of COVID-19 mathematical model with stochastic perturbation Z Zhang, A Zeb, S Hussain, E Alzahrani Advances in difference equations 2020 (1), 451, 2020 | 133 | 2020 |
| Square-root dynamics of a giving up smoking model A Zeb, G Zaman, S Momani Applied Mathematical Modelling 37 (7), 5326-5334, 2013 | 113 | 2013 |
| Dynamics of a fractional order mathematical model for COVID-19 epidemic Z Zhang, A Zeb, OF Egbelowo, VS Erturk Advances in difference equations 2020 (1), 420, 2020 | 94 | 2020 |
| Extended hybrid controller design of bifurcation in a delayed chemostat model C Xu, Q Cui, Z Liu, Y Pan, X Cui, W Ou, M Rahman, M Farman, S Ahmad, ... MATCH Commun. Math. Comput. Chem 90 (3), 609-648, 2023 | 73 | 2023 |
| Control of COVID-19 dynamics through a fractional-order model S Bushnaq, T Saeed, DFM Torres, A Zeb Alexandria Engineering Journal 60 (4), 3587-3592, 2021 | 68 | 2021 |
| A robust study of a piecewise fractional order COVID-19 mathematical model A Zeb, A Atangana, ZA Khan, S Djillali Alexandria Engineering Journal 61 (7), 5649-5665, 2022 | 67 | 2022 |
| Bifurcation dynamics and control mechanism of a fractional–order delayed Brusselator chemical reaction model C Xu, D Mu, Z Liu, Y Pang, C Aouiti, O Tunc, S Ahmad, A Zeb Match 89 (1), 2023 | 56 | 2023 |
| Global sensitivity analysis of COVID-19 mathematical model Z Zhang, R Gul, A Zeb Alexandria Engineering Journal 60 (1), 565-572, 2021 | 54 | 2021 |
| A vigorous study of fractional order COVID-19 model via ABC derivatives XP Li, H Al Bayatti, A Din, A Zeb Results in Physics 29, 104737, 2021 | 53 | 2021 |
| Mathematical study on bifurcation dynamics and control mechanism of tri‐neuron bidirectional associative memory neural networks including delay W Ou, C Xu, Q Cui, Z Liu, Y Pang, M Farman, S Ahmad, A Zeb Mathematical Methods in the Applied Sciences 48 (7), 7820-7844, 2025 | 49 | 2025 |
| On the analysis of Caputo fractional order dynamics of Middle East Lungs Coronavirus (MERS-CoV) model QT Ain, N Anjum, A Din, A Zeb, S Djilali, ZA Khan Alexandria Engineering Journal 61 (7), 5123-5131, 2022 | 47 | 2022 |
| Stability characterization of a fractional-order viral system with the non-cytolytic immune assumption M Naim, Y Sabbar, A Zeb Mathematical Modelling and Numerical Simulation with Applications 2 (3), 164-176, 2022 | 46 | 2022 |
| Dynamics of a stochastic COVID-19 epidemic model with jump-diffusion A Tesfay, T Saeed, A Zeb, D Tesfay, A Khalaf, J Brannan Advances in Difference Equations 2021 (1), 228, 2021 | 42 | 2021 |
| Mathematical modeling and control of infectious diseases G Zaman, IH Jung, DFM Torres, A Zeb Computational and mathematical methods in Medicine 2017, 7149154, 2017 | 42 | 2017 |
| Mathematical analysis of HBV and HCV co-infection model under nonsingular fractional order derivative WY Shen, YM Chu, M ur Rahman, I Mahariq, A Zeb Results in Physics 28, 104582, 2021 | 38 | 2021 |
| Nonlinear ion flux caused by dust ion-acoustic nonlinear periodic waves in non-thermal plasmas M Khalid, F Hadi, A Zeb Pramana 92 (6), 86, 2019 | 38 | 2019 |
| Study of COVID-19 mathematical model of fractional order via modified Euler method G Nazir, A Zeb, K Shah, T Saeed, RA Khan, SIU Khan Alexandria Engineering Journal 60 (6), 5287-5296, 2021 | 37 | 2021 |
| Crowding effects on the dynamics of COVID-19 mathematical model Z Zhang, A Zeb, E Alzahrani, S Iqbal Advances in Difference Equations 2020 (1), 675, 2020 | 37 | 2020 |
| The homotopy analysis method for approximating of giving up smoking model in fractional order A Zeb, MI Chohan, G Zaman Scientific Research Publishing, 2012 | 37 | 2012 |
