Adding machines and open dynamical systems

Abstract

Let f:M→M be a continuous map defined on a compact metric space M. An open dynamical system introduces disjoint open balls centered at points in M, and considers the trajectories of points from M, and the balls that they visit first. As the balls in question are allowed to shrink, a point is considered indecisive if its trajectory changes infinitely many times the ball first visited. Here, we let M be an adding machine, a simple system and a solenoidal system. In each case, we show that the set of points which generate indecisive trajectories is residual. Keywords: Open dynamical system, Adding machine, Solenoidal system, Baire category