Title :
Convergence Analysis for Initial Condition Estimation in Coupled Map Lattice Systems
Author :
Lanxin Lin ; Minfen Shen ; So, Hing Cheung ; Chunqi Chang
Author_Institution :
Dept. of Electron. Eng., City Univ. of Hong Kong, Hong Kong, China
Abstract :
In this correspondence, we focus on studying the problem of initial condition estimation for chaotic signals within the coupled map lattice (CML) systems. To investigate the effectiveness of a CML initial condition estimation method with different maps and coupling coefficients, the convergence and divergence properties of the inverse CML systems are analyzed. An inverse largest Lyapunov exponent (ILLE) is proposed to investigate the strength of convergence and divergence in the inverse CML systems, and it can determine if the CML initial condition estimation method is effective. Computer simulations are included to verify the relationship between the effectiveness of the CML initial condition estimation method and its corresponding ILLE.
Keywords :
Lyapunov methods; chaos; convergence; signal processing; ILLE; chaotic signal; computer simulation; convergence analysis; convergence properties; coupled map lattice system; coupling coefficient; divergence properties; initial condition estimation; inverse CML system; inverse largest Lyapunov exponent; signal processing; Chaos; Convergence; Couplings; Estimation; Lattices; Noise; Vectors; Coupled map lattice (CML); initial condition estimation; largest Lyapunov exponent; signal processing; symbolic dynamic;
Journal_Title :
Signal Processing, IEEE Transactions on
DOI :
10.1109/TSP.2012.2195659
