Control and numerical analysis for cancer chaotic system

This article investigates the problem of control of chaotic dynamics of tumor cells, immune system cells, and healthy tissue cells in a three-dimensional cancer model by adaptive control technique. Adaptive control law is derived such that the trajectory of controlled system asymptotically approaches equilibrium point with estimated parameter converges to stabilizing values. A nonlinear control law is designed which change the original chaotic system into a controlled one linear system. In addition, we present and analyze numerical solution of the cancer dynamical system with the help of a discretization technique. Achieved solutions show a comparable results with Runge–Kutta methods. The reliability and accuracy of the proposed technique is presented by comparing numerical results. The used technique has displayed a brilliant prospective in dealing with the numerical solutions of nonlinear dynamical systems.

[1]  Guanrong Chen,et al.  Chen's Attractor Exists , 2004, Int. J. Bifurc. Chaos.

[2]  A. Algaba,et al.  Comment on "Sil'nikov chaos of the Liu system" [Chaos 18, 013113 (2008)]. , 2011, Chaos.

[3]  Fangqi Chen,et al.  Sil'nikov chaos of the Liu system. , 2008, Chaos.

[4]  Salman Ahmad,et al.  Analytical and numerical study of Hopf bifurcation scenario for a three-dimensional chaotic system , 2016 .

[5]  Runzi Luo,et al.  Synchronization of uncertain fractional-order chaotic systems via a novel adaptive controller , 2017 .

[6]  Faizan Ahmed,et al.  Improved numerical solutions for chaotic-cancer-model , 2017 .

[7]  Ravi Kiran Maddali,et al.  Dynamics of a Three Dimensional Chaotic Cancer Model , 2018 .

[8]  Harun Taskin,et al.  Control and synchronization of chaotic supply chains using intelligent approaches , 2016, Comput. Ind. Eng..

[9]  Joseph Malinzi,et al.  Mathematical Analysis of a Mathematical Model of Chemovirotherapy: Effect of Drug Infusion Method , 2019, Comput. Math. Methods Medicine.

[10]  A. Perelson,et al.  Nonlinear dynamics of immunogenic tumors: parameter estimation and global bifurcation analysis. , 1994, Bulletin of mathematical biology.

[11]  S. Hussain,et al.  Continuous Galerkin Petrov Time Discretization Scheme for the Solutions of the Chen System , 2015 .

[12]  Stephen P. Banks,et al.  Chaos in a Three-Dimensional Cancer Model , 2010, Int. J. Bifurc. Chaos.

[13]  P. Gholamin,et al.  A new three-dimensional chaotic system: Dynamical properties and simulation , 2017 .

[14]  Steven H. Strogatz,et al.  Nonlinear Dynamics and Chaos , 2024 .

[15]  Chao-Chung Peng,et al.  Robust chaotic control of Lorenz system by backstepping design , 2008 .

[16]  B. Yue,et al.  Nonlinear analysis of stretch-twist-fold (STF) flow , 2013 .

[17]  O. Rössler Chaotic Behavior in Simple Reaction Systems , 1976 .

[18]  Zhen Sun Synchronization of fractional-order chaotic systems with non-identical orders, unknown parameters and disturbances via sliding mode control , 2018, Chinese Journal of Physics.

[19]  M. Aqeel,et al.  Control of chaos in thermal convection loop by state space linearization , 2019, Chinese Journal of Physics.

[20]  Lei Zhang,et al.  Initial value-related dynamical analysis of the memristor-based system with reduced dimensions and its chaotic synchronization via adaptive sliding mode control method , 2019, Chinese Journal of Physics.

[21]  Chun-Mei Yang,et al.  A Detailed Study of Adaptive Control of Chaotic Systems with Unknown Parameters , 1998 .