Mean dimension and a sharp embedding theorem: extensions of aperiodic subshifts
Abstract
We show that if (X,T) is an extension of an aperiodic subshift (a subsystem of (1,2,...,lZ,shift) for some l∈N) and has mean dimension mdim(X,T)<D2 (D∈ N), then it embeds equivariantly in (([0,1]D)Z,shift). The result is sharp. If (X,T) is an extension of an aperiodic zero-dimensional system then it embeds equivariantly in (([0,1]D+1)Z,shift)$.
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