Given a dynamical system (X,T) one can define a speedup of (X,T) as
another dynamical system conjugate to S:XβX where
S(x)=Tp(x)(x) for some function p:XβZ+. In 1985
Arnoux, Ornstein, and Weiss showed that any aperiodic, not necessarily ergodic,
measure preserving system is isomorphic to a speedup of any ergodic measure
preserving system. In this paper we study speedups in the topological category.
Specifically, we consider minimal homeomorphisms on Cantor spaces. Our main
theorem gives conditions on when one such system is a speedup of another.
Furthermore, the main theorem serves as a topological analogue of the Arnoux,
Ornstein, and Weiss speedup theorem, as well as a 'one-sided" orbit equivalence
theorem