DocumentCode
527860
Title
The chaotic dynamics movement under the invoke of non-Gaussian bounded noise
Author
Song, Jihong
Author_Institution
Dept. of Electron. Inf. Eng., Changchun Univ., Changchun, China
Volume
6
fYear
2010
fDate
10-12 Aug. 2010
Firstpage
3085
Lastpage
3088
Abstract
From the research of the non-linear system movement under the invoke of weak signal and non-Gaussion bounded noise based on random Melnikov methods, we find out the non-Gaussion bounded noise can reduce amplitude of the weak signal and has some stable effect on the chaotic system, as for the bigger wiener process parameters, the gate value of the chaotic movement will be more bigger with the strength of non-Gaussion bounded noise. This paper researches the chaotic movement character under the invoke of weak signal and non-Gaussion bounded noise.
Keywords
chaotic communication; nonlinear systems; random noise; signal detection; stochastic processes; Wiener process; chaotic dynamics movement; nonGaussion bounded noise; nonlinear system; random Melnikov method; weak signal; Chaotic communication; Harmonic analysis; Indexes; Noise; Orbits; Random processes; chaotic; non-Gaussion bounded noise; random Melnikov process;
fLanguage
English
Publisher
ieee
Conference_Titel
Natural Computation (ICNC), 2010 Sixth International Conference on
Conference_Location
Yantai, Shandong
Print_ISBN
978-1-4244-5958-2
Type
conf
DOI
10.1109/ICNC.2010.5584672
Filename
5584672
Link To Document