Unstable periodic orbits and the dimensions of multifractal chaotic attractors
Abstract
The probability measure generated by typical chaotic orbits of a dynamical system can have an arbitrarily finescaled interwoven structure of points with different singularity scalings. Recent work has characterized such measures via a spectrum of fractal dimension values. In this paper we pursue the idea that the infinite number of unstable periodic orbits embedded in the support of the measure provides the key to an understanding of the structure of the subsets with different singularity scalings. In particular, a formulation relating the spectrum of dimensions to unstable periodic orbits is presented for hyperbolic maps of arbitrary dimensionality. Both chaotic attractors and chaotic repellers are considered.
 Publication:

Physical Review A
 Pub Date:
 March 1988
 DOI:
 10.1103/PhysRevA.37.1711
 Bibcode:
 1988PhRvA..37.1711G
 Keywords:

 Chaos;
 Dynamical Systems;
 Ergodic Process;
 Fractals;
 Orbits;
 Strange Attractors;
 Iterative Solution;
 Singularity (Mathematics);
 Physics (General);
 03.20.+i;
 47.20.Ky;
 47.20.Tg;
 47.25.Ae;
 Nonlinearity bifurcation and symmetry breaking