On the representation of measurable and continuous dynamical systems by Lipschitz functions

Abstract

Two representations theorems are presented: 1. Any Borel action of a second countable locally compact group G on a standard Borel space X admits an injective G-equivariant Borel map into the shift space of 1-Lipschitz functions from G to the unit interval Lip1(G). 2. Any continuous action of Rk (k∈ N) on a metrizable compact space X admits an injective G-equivariant continuous map into Lip1(Rk) if the fixed point set Fix(X,Rk) embeds into [0,1] and (X,Rk) is weakly locally free, that is Rk acts freely outside the fixed point set. The first theorem generalizes a theorem from 1973 by Eberlein for R-flows. The second theorem generalizes a Lipschitz refinement of the Bebutov-Kakutani theorem proven by Gutman, Jin and Tsukamoto in 2019.