A Lipschitz refinement of the Bebutov--Kakutani dynamical embedding theorem
Abstract
We prove that an R-action on a compact metric space embeds equivariantly in the space of one-Lipschitz functions R[0,1] if its fixed point set can be topologically embedded in the unit interval. This is a refinement of the classical Bebutov--Kakutani theorem (1968).
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