Title :
Evidencing chaos from dimensions?
Author :
Flandrin, Patrick ; Michel, Olivier
Author_Institution :
Ecole Normale Superieure de Lyon, France
Abstract :
Many algorithms, aimed at discriminating deterministic chaos from stochastic noise, are based on the estimation of some (fractal) dimensions in a reconstructed phase-space. We emphasize the fact that misleading results can be obtained when the signals under study exhibit themselves some fractal properties. Current methods are therefore revisited in order to provide “dimension” informations which are more directly related to the number of degrees of freedom involved in the dynamics of a system rather than to the purely geometrical structure of its reconstructed attractor. This is essentially achieved by extending existing second-order techniques up to fourth-order
Keywords :
chaos; fractals; higher order statistics; noise; signal processing; stochastic processes; algorithms; deterministic chaos; dimensions; fourth-order techniques; fractal; geometrical structure; reconstructed attractor; reconstructed phase-space; second-order techniques; signal processing; stochastic noise;
Conference_Titel :
Exploiting Chaos in Signal Processing, IEE Colloquium on
Conference_Location :
London
