Mathematical Analysis of Lengyel-Epstein Chemical Reaction Model by Fractional-Order Differential Equation’s System with Multi-Orders

[1] I. R. Epstein and J. A. Pojman, An Introduction to Nonlinear Chemical Dynamics.: Oxford University Press, 1998.
[2] C. Chicone, "Mathematical Modeling and Chemical Kinetics," a module on chemical kinetics for the University of Missouri Mathematics in Life Science program, vol. 8, January 2010.
[3] I. Lengyel and I. R. Epstein, "Modeling of Turing structure in the chlorite–iodide–malonic–acid–starch reaction system," Science, vol. 251, no. 650-652, 1991.
[4] B. Daşbaşı, "The Fractional-Order mathematical modeling of bacterial resistance against multiple antibiotics in case of local bacterial infection," Sakarya University Journal of Science, vol. 251, no. 3, pp. 1-16, 2017.
[5] H. El-Saka and A. El-Sayed, Fractional Order Equations and Dynamical Systems. Germany: Lambrt Academic Publishing, 2013.[6] H.A. El-Saka, E. Ahmed, M.I. Shehata, and A.M.A. El-Sayed, "On stability, persistence and Hopf Bifurcation in fractional order dynamical systems," Nonlinear Dyn., vol. 56, pp. 121-126, 2009.
[7] A. M. A. El-Sayed, E. M. El-Mesiry, and H. A. A. El-Saka, "On the fractional-order logistic equation," AML, vol. 20, pp. 817-823, 2007.
[8] I. Podlubny, Fractional Differential Equations.: Academic Press, 1999.
[9] I. Podlubny and A.M.A. El-Sayed, On Two Definitions of Fractional Calculus.: Slovak Academy of Science, Institute of Experimental Phys., 1996.
[10] Z. M. Odibat, "Analytic study on linear systems of fractional differential equations," Computers and Mathematics with Applications, vol. 59, 2010.
[11] W. Deng, "Analysıs of Fractional Differential Equations with Multi-Orders," Fractals, vol. 15, no. 173, pp. 173-182, 2007.
[12] D. Matignon, "Stability results for fractional differential equations with applications to control processing," Comput. Eng. Sys. Appl. 2, vol. 963, 1996.
[13] E. Ahmed, A.M.A. El-Sayed, and H.A.A. El-Saka, "Equilibrium points, stability and numerical solutions of fractional-order predator-prey and rabies models," J. Math. Anal. Appl., vol. 325, pp. 542-553, 2007.
[14] E. Ahmed, A.M.A. El-Sayed, and H.A.A. El-Saka, "On some Routh–Hurwitz conditions for fractional order differential equations and their applications in Lorenz, Rössler, Chua and Chen systems," Phys. Lett. A, vol. 358, 2006.
[15] J. D. Murray, Mathematical Biology. I. An introduction, 3rd ed. Springer-Verlag, NewYork, Berlin, Heidelberg, 2002, vol. Vol. 17 of Interdisciplinary AppliedMathematics, Vol. 17 of Interdisciplinary AppliedMathematics.
[16] J. Hale and H. Koçak, Dynamics and Bifurcations. New York: Springer-Verlag, 1991.
[17] B. Daşbaşı and İ. Öztürk, "Mathematical modelling of bacterial resistance to multiple antibiotics and immune system response," SpringerPlus, vol. 5, no. 408, pp. 1-17, 2016.
[18] L. J. S. Allen, An Introduction to Mathematical Biology., 2007, ISBN 10: 0-13-035216-0.
[19] B. Daşbaşı, İ. Öztürk, and F. Özköse, "Mathematical Modelling of Bacterial Competition with Multiple Antibiotics and it's Stability Analysis," Karaelmas Fen ve Mühendislik Dergisi, vol. 6, no. 2, pp. 299-306, 2016.