Negative β-transformations: invariant measures, subshifts of finite type and matching property
Abstract
We study the negative beta transformations T-β:=-β x +β x+1 for x∈(0,1] and β>1. We present a complete characterization of pairs of dstinct non-integers with the same T-β-invariant measure: for two non-integers β1 ,β2 >1, the invariant measures of negative β-transformation coincide if and only if β1 is the root of equation x2-qx-p=0, where p,q∈N with p≤ q, and β2 = β1 + 1. Furthermore, we show that T-β has matching property for all β being generalized multinacci numbers. We also prove that the set of simple -β numbers, whose -β-shifts are subshifts of finite type, is dense in the parameter interval (1,∞).
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