Borel subsystems and ergodic universality for compact Zd-systems via specification and beyond

Abstract

A Borel system (X,S) is `almost Borel universal' if any free Borel dynamical system (Y,T) of strictly lower entropy is isomorphic to a Borel subsystem of (X,S), after removing a null set. We obtain and exploit a new sufficient condition for a topological dynamical system to be almost Borel universal. We use our main result to deduce various conclusions and answer a number of questions. Along with additional results, we prove that a `generic' homeomorphism of a compact manifold of topological dimension at least two can model any ergodic transformation, that non-uniform specification implies almost Borel universality, and that 3-colorings in Zd and dimers in Z2 are almost Borel universal