The measure transfer for subshifts induced by a morphism of free monoids

Abstract

Every non-erasing monoid morphism σ: A* B* induces a measure transfer map σXM: M(X) M(σ(X)) between the measure cones M(X) and M(σ(X)), associated to any subshift X ⊂ AZ and its image subshift σ(X) ⊂ BZ respectively. We define and study this map in detail and show that it is continuous, linear and functorial. It also turns out to be surjective BHL2.8-II. Furthermore, an efficient technique to compute the value of the transferred measure σXM(μ) on any cylinder [w] (for w ∈ B*) is presented. Theorem: If a non-erasing morphism σ: A* B* is injective on the shift-orbits of some subshift X ⊂ AZ, then σMX is injective. The assumption on σ that it is ``injective on the shift-orbits of X'' is strictly weaker than ``recognizable in X'', and strictly stronger than ``recognizable for aperiodic points in X''. The last assumption does in general not suffice to obtain the injectivity of the measure transfer map σXM.

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