Random cyclic dynamical systems

Abstract

For X a finite subset of the circle and for 0 < r <= 1 fixed, consider the function fr : X -> X which maps each point to the clockwise furthest element of X within angular distance less than 2 pi r. We study the discrete dynamical system on X generated by fr, and especially its expected behavior when X is a large random set. We show that, as |X| -> infinity, the expected fraction of periodic points of fr tends to 0 if r is irrational and to 1/q if r = p/q is rational with p and q coprime. These results are obtained via more refined statistics of fr which we compute explicitly in terms of (generalized) Catalan numbers. The motivation for studying fr comes from Vietoris-Rips complexes, a geometric construction used in computational topology. Our results determine how much one can expect to simplify the Vietoris-Rips complex of a random sample of the circle by removing dominated vertices.