Invariant measures and orbit equivalence for generalized Toeplitz subshifts
Abstract
We show that for every metrizable Choquet simplex K and for every group G, which is infinite, countable, amenable and residually finite, there exists a Toeplitz G-subshift whose set of shift-invariant probability measures is affine homeomorphic to K. Furthermore, we get that for every integer d≥ 1 and every Toeplitz flow (X,T), there exists a Toeplitz Zd-subshift which is topologically orbit equivalent to (X,T).
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