Clustering of exponentially separating trajectories

Abstract

It might be expected that trajectories for a dynamical system which has no negative Lyapunov exponent (implying exponential growth of small separations will not cluster together. However, clustering can occur such that the density ( x) of trajectories within distance x of a reference trajectory has a power-law divergence, so that ( x) x-β when x is sufficiently small, for some 0<β<1. We demonstrate this effect using a random map in one dimension. We find no evidence for this effect in the chaotic logistic map, and argue that the effect is harder to observe in deterministic maps.