Measure transfer and S-adic developments for subshifts

Abstract

Based on previous work of the authors, to any S-adic development of a subshift X a "directive sequence" of commutative diagrams is associated, which consists at every level n ≥ 0 of the measure cone and the letter frequency cone of the level subshift Xn associated canonically to the given S-adic development. The issuing rich picture enables one to deduce results about X with unexpected directness. For instance, we exhibit a large class of minimal subshifts with entropy zero that all have infinitely many ergodic probability measures. As a side result we also exhibit, for any integer d ≥ 2, an S-adic development of a minimal, aperiodic, uniquely ergodic subshift X, where all level alphabets An have cardinality d\,, while none of the d-2 bottom level morphisms is recognizable in its level subshift Xn ⊂ An Z.

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