On the difference equation yn+ 1= α+ βe-ynγ+ yn-1 I Ozturk, F Bozkurt, S Ozen Applied Mathematics and Computation 181 (2), 1387-1393, 2006 | 62* | 2006 |
Global stability in a population model with piecewise constant arguments F Gurcan, F Bozkurt Journal of Mathematical Analysis and Applications 360 (1), 334-342, 2009 | 47 | 2009 |
Effects of fear in a fractional-order predator-prey system with predator density-dependent prey mortality FB Yousef, A Yousef, C Maji Chaos, Solitons & Fractals 145, 110711, 2021 | 40 | 2021 |
Stability analysis of a fractional order differential equation model of a brain tumor growth depending on the density F Bozkurt, T Abdeljawad, MA Hajji Applied and Computational Mathematics 14 (1), 50-62, 2015 | 36 | 2015 |
Stability and bifurcation analysis of a mathematical model for tumor–immune interaction with piecewise constant arguments of delay F Gurcan, S Kartal, I Ozturk, F Bozkurt Chaos, Solitons & Fractals 68, 169-179, 2014 | 33 | 2014 |
Stability analysis of a population model with piecewise constant arguments I Ozturk, F Bozkurt Nonlinear Analysis: Real World Applications 12 (3), 1532-1545, 2011 | 31 | 2011 |
A fractional-order model of COVID-19 considering the fear effect of the media and social networks on the community F Bozkurt, A Yousef, T Abdeljawad, A Kalinli, Q Al Mdallal Chaos, Solitons & Fractals 152, 111403, 2021 | 30 | 2021 |
A mathematical model of the evolution and spread of pathogenic coronaviruses from natural host to human host F Bozkurt, A Yousef, D Baleanu, J Alzabut Chaos, Solitons & Fractals 138, 109931, 2020 | 30 | 2020 |
Modeling a tumor growth with piecewise constant arguments F Bozkurt Discrete Dynamics in Nature and Society 2013, 2013 | 27 | 2013 |
Stability analysis of a mathematical model in a microcosm with piecewise constant arguments I Öztürk, F Bozkurt, F Gurcan Mathematical Biosciences 240 (2), 85-91, 2012 | 25 | 2012 |
Stability analysis of a nonlinear difference equation F Bozkurt International Journal of Modern Nonlinear Theory and Application 2 (1), 1-6, 2013 | 24 | 2013 |
Mathematical modeling of the immune-chemotherapeutic treatment of breast cancer under some control parameters A Yousef, F Bozkurt, T Abdeljawad Advances in Difference Equations 2020 (1), 696, 2020 | 21 | 2020 |
Stability analysis of a fractional-order differential equation system of a GBM-IS interaction depending on the density F Bozkurt Applied Mathematics & Information Sciences 8 (3), 2014 | 21 | 2014 |
Mathematical modelling of HIV epidemic and stability analysis F Bozkurt, F Peker Advances in Difference Equations 2014, 1-17, 2014 | 19 | 2014 |
Analysis of the outbreak of the novel coronavirus COVID-19 dynamic model with control mechanisms F Bozkurt, A Yousef, T Abdeljawad Results in Physics 19, 103586, 2020 | 17 | 2020 |
Global asymptotic behavior of the difference equation yn+ 1= α⋅ e−(nyn+ (n− k) yn− k) β+ nyn+ (n− k) yn− k I Ozturk, F Bozkurt, S Ozen Applied mathematics letters 22 (4), 595-599, 2009 | 14 | 2009 |
Stability analysis and simulation of the novel Corornavirus mathematical model via the Caputo fractional-order derivative: A case study of Algeria Y El hadj Moussa, A Boudaoui, S Ullah, F Bozkurt, T Abdeljawad, ... Results in physics 26, 104324, 2021 | 13 | 2021 |
Modeling and analysis of an SI1I2R epidemic model with nonlinear incidence and general recovery functions of I1 AA Thirthar, RK Naji, F Bozkurt, A Yousef Chaos, Solitons & Fractals 145, 110746, 2021 | 12 | 2021 |
Effect of Weather on the Spread of COVID-19 Using Eigenspace Decomposition. MA Alqudah, T Abdeljawad, A Zeb, IU Khan, F Bozkurt Computers, Materials & Continua 69 (3), 2021 | 11 | 2021 |
Qualitative analysis of a fractional pandemic spread model of the novel coronavirus (COVID-19) A Yousef, F Bozkurt, T Abdeljawad Comput Materials Continua 66 (1), 843-869, 2021 | 11 | 2021 |