Complex modified function projective synchronization of complex chaotic systems with known and unknown complex parameters

Abstract Much progress has been made in the research of modified function projective synchronization (MFPS) for real (complex) chaotic systems with real parameters. The scaling functions are always chosen as real-valued ones in previous MFPS schemes for chaotic systems evolving in the same or inverse directions simultaneously. However, MFPS with different complex-valued scaling functions (CMFPS) has not been previously reported, where complex-variable chaotic (hyperchaotic) systems (CVCSs) evolve in different directions with a time-dependent intersection angle. Therefore, CMFPS is discussed for CVCSs with known and unknown complex parameters in this paper. By constructing appropriate Lyapunov functions defined on complex field, and employing adaptive control technique, a set of simple and practical sufficient conditions for achieving CMFPS are derived, and complex update laws for estimating unknown parameters are also given. The corresponding theoretical proofs and computer simulations are worked out to demonstrate the effectiveness and feasibility of the proposed schemes.

[1]  Emad E. Mahmoud,et al.  Synchronization and control of hyperchaotic complex Lorenz system , 2010, Math. Comput. Simul..

[2]  K. Rypdal,et al.  Experimental evidence of low-dimensional chaotic convection dynamics in a toroidal magnetized plasma. , 2008, Physical review. E, Statistical, nonlinear, and soft matter physics.

[3]  Gamal M. Mahmoud,et al.  BASIC PROPERTIES AND CHAOTIC SYNCHRONIZATION OF COMPLEX LORENZ SYSTEM , 2007 .

[4]  Mark J. McGuinness,et al.  The real and complex Lorenz equations in rotating fluids and lasers , 1982 .

[5]  Tassos Bountis,et al.  The Dynamics of Systems of Complex Nonlinear oscillators: a Review , 2004, Int. J. Bifurc. Chaos.

[6]  Mark J. McGuinness,et al.  The complex Lorenz equations , 1982 .

[7]  Yongguang Yu,et al.  Author's Personal Copy Nonlinear Analysis: Real World Applications Adaptive Generalized Function Projective Synchronization of Uncertain Chaotic Systems , 2022 .

[8]  Chao Luo,et al.  Hybrid modified function projective synchronization of two different dimensional complex nonlinear systems with parameters identification , 2013, J. Frankl. Inst..

[9]  E. Lorenz Deterministic nonperiodic flow , 1963 .

[10]  H. Moon,et al.  Transitions to chaos in the Ginzburg-Landau equation , 1983 .

[11]  Shutang Liu,et al.  A Novel Four-Wing Hyperchaotic Complex System and Its Complex Modified Hybrid Projective Synchronization with Different Dimensions , 2014 .

[12]  Junwei Sun,et al.  Adaptive generalized hybrid function projective dislocated synchronization of new four-dimensional uncertain chaotic systems , 2015, Appl. Math. Comput..

[13]  Wang Xing-Yuan,et al.  Adaptive modified function projective lag synchronization of hyperchaotic complex systems with fully uncertain parameters , 2014 .

[14]  Fangfang Zhang,et al.  Complex function projective synchronization of complex chaotic system and its applications in secure communication , 2013, Nonlinear Dynamics.

[15]  Tassos Bountis,et al.  Active Control and Global Synchronization of the Complex Chen and lÜ Systems , 2007, Int. J. Bifurc. Chaos.

[16]  Da Lin,et al.  Module-phase synchronization in complex dynamic system , 2010, Appl. Math. Comput..

[17]  Xing-yuan Wang,et al.  Projective synchronization of fractional order chaotic system based on linear separation , 2008 .

[18]  G. J. M. Maree,et al.  Slow Periodic Crossing of a Pitchfork Bifurcation in an Oscillating System , 1997 .

[19]  Chunhua Yuan,et al.  Adaptive complex modified projective synchronization of complex chaotic (hyperchaotic) systems with uncertain complex parameters , 2015 .

[20]  Mark J. McGuinness,et al.  The real and complex Lorenz equations and their relevance to physical systems , 1983 .

[21]  Xiang Li,et al.  Adaptive modified function projective synchronization of general uncertain chaotic complex systems , 2012 .

[22]  Paul Mandel,et al.  Influence of detuning on the properties of laser equations , 1985 .

[23]  Chen Xu,et al.  Complex projective synchronization in drive-response stochastic coupled networks with complex-variable systems and coupling time delays , 2015, Commun. Nonlinear Sci. Numer. Simul..

[24]  Julien Clinton Sprott,et al.  Adaptive complex modified hybrid function projective synchronization of different dimensional complex chaos with uncertain complex parameters , 2016 .