Nowhere dense competing holes in open dynamical systems

Abstract

Let M be a compact metric space with no isolated points, and f:M a homeomorphism. Consider a sequence of shrinking open balls \Bin\n∈Ni∈N with centers \pi\i=1∞⊂eqM and radii \in\n=1∞. For every point x∈M and n∈N, consider which ball the trajectory \x,f(x),f2(x),…\ of the point first visits. We find that whenever the closure of \pi\i=1∞ is nowhere dense, and with very minor restrictions on \ni\n∈Ni∈N, the typical trajectory \fk(x)\k=0∞ will first visit, for each i, the ball Bin, for infinitely many n. This is never the case, should \pi\i=1∞ be somewhere dense. Keywords: Open Dynamical System, Topological Dynamics, Transitive Homeomorphism, Baire category. MSC2020: 37B05, 37B20, 18F60, 54E52.