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|Type:||Artigo de periódico|
|Title:||PERIODIC LOCKING IN HETEROCHAOTIC SYSTEMS|
|Abstract:||Different particular chaotic systems with Lyapunov exponents in the form(+, 0, -) can be coupled in a way so that the expanding in phase space of each system will be canceled by the other and the coupled system will fall into a stable limit cycle with Lyapunov exponents in the form (0, -, -, -, -, -). After coupling, the two different initially chaotic oscillating systems will be locked on two different per;odic orbits, respectively. Chaos present in each system is thus suppressed. We show numerically the existence of this periodic locking in the coupling of Lorenz and Rossler systems.|
|Editor:||Elsevier Science Bv|
|Appears in Collections:||Unicamp - Artigos e Outros Documentos|
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