Recurrence in collective dynamics: From the hyperspace to fuzzy dynamical systems

Abstract

We study for a dynamical system f:X X some of the principal topological recurrence-kind properties with respect to the induced maps f:K(X)(X), on the hyperspace of non-empty compact subsets of X, and f:F(X)(X), on the space of normal fuzzy sets consisting of the upper-semicontinuous functions u:X [0,1] with compact support and such that u-1(\1\)≠. In particular, we characterize the properties of topological and multiple recurrence for the extended systems (K(X),f) and (F(X),f), which cover the cases of the so-called nonwandering and Van der Waerden systems. Special attention is given to the case where the underlying space is completely metrizable, for which we obtain some stronger point-recurrence equivalences.