Dynamical behaviour of fractional order tumor model with Caputo and conformable fractional derivative E Balcı, İ Öztürk, S Kartal Chaos, Solitons & Fractals 123, 43-51, 2019 | 76 | 2019 |
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 | 57 | 2006 |
On the theory of fractional differential equation I Ozturk Доклады Адыгской (Черкесской) Международной академии наук 3 (2), 35-39, 1998 | 52 | 1998 |
Mathematical modelling of bacterial resistance to multiple antibiotics and immune system response B Daşbaşı, İ Öztürk SpringerPlus 5, 1-17, 2016 | 39 | 2016 |
A fractional modeling of tumor–immune system interaction related to Lung cancer with real data F Özköse, S Yılmaz, M Yavuz, İ Öztürk, MT Şenel, BŞ Bağcı, M Doğan, ... The European Physical Journal Plus 137, 1-28, 2022 | 38 | 2022 |
Stability analysis of fractional order mathematical model of tumor-immune system interaction I Öztürk, F Özköse Chaos, Solitons & Fractals 133, 109614, 2020 | 33 | 2020 |
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 |
Flow structure on nonslender delta wing: Reynolds number dependence and flow control M Zharfa, I Ozturk, MM Yavuz AIAA Journal 54 (3), 880-897, 2016 | 32 | 2016 |
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 |
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 |
A fractional modeling of tumor-immune system interaction related to lung cancer with real data F Ozkose, S Yılmaz, M Yavuz, I Ozturk, M Şenel, B Bagci, M Dogan, ... European Physical Journal Plus 137 (1), 2021 | 15 | 2021 |
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 |
Comparison of dynamical behavior between fractional order delayed and discrete conformable fractional order tumor-immune system E Balci, S Kartal, I Ozturk Mathematical Modelling of Natural Phenomena 16, 3, 2021 | 9 | 2021 |
On the recursive sequence yn+ 1= α+ yn-1β+ yn+ yn-1yn S Ozen, I Ozturk, F Bozkurt Applied mathematics and computation 188 (1), 180-188, 2007 | 9 | 2007 |
THE GLOBAL BEHAVIOR OF THE DIFFERENCE EQUATION. F Bozkurt, I Ozturk, S Ozen Studia Universitatis Babes-Bolyai, Mathematica, 2009 | 8 | 2009 |
On the difference equation xn+ 1 (α10+ α11e− xn)/(α12+ xn− 1) I Ozturk, F Bozkurt, S Ozen Applied Mathematics and Computation 181 (2), 1387-1393, 2006 | 8 | 2006 |
GRUNWALD-LETNIKOV, RIEMANN-LIOUVILLE VE CAPUTO KESİRSEL TÜREVLERİ ÜZERİNE S Özen, İ Öztürk Erciyes Üniversitesi Fen Bilimleri Enstitüsü Fen Bilimleri Dergisi 20 (1), 66-76, 2004 | 8 | 2004 |
Boundary value problem for the loaded differential equation of fractional order I Ozturk Доклады Адыгской (Черкесской) Международной академии наук 1 (2), 12-17, 1995 | 8 | 1995 |
Dynamical analysis of discretized Logistic model with Caputo-Fabrizio fractional derivative H Karakaya, I Ozturk, S Kartal, F Gurcan Computational Ecology and Software 11 (1), 21-34, 2021 | 6 | 2021 |
On the stability analysis of the general mathematical modeling of bacterial infection B Daşbaşi, İ Öztürk International Journal of Engineering and Applied Sciences 10 (2), 93-117, 2018 | 6 | 2018 |