2016
DOI: 10.1090/proc/13400
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Markov partitions, Martingale and symmetric conjugacy of circle endomorphisms

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“…That is, the conjugacy between two geometrically finite onedimensional maps is smooth if and only if the maps have the same scaling function and the exponents of the corresponding power-law singularities are the same. More results on differential properties and the symmetric properties of a conjugacy between two one-dimensional maps are given in [6,17]. Finally, the symmetric regularity of the conjugacy between two one-dimensional maps (with possible singularities) becomes an important issue in the study of one-dimensional dynamical systems, in particular in the study of geometric Gibbs theory (see [11,15,16]).…”
Section: Introductionmentioning
confidence: 99%
“…That is, the conjugacy between two geometrically finite onedimensional maps is smooth if and only if the maps have the same scaling function and the exponents of the corresponding power-law singularities are the same. More results on differential properties and the symmetric properties of a conjugacy between two one-dimensional maps are given in [6,17]. Finally, the symmetric regularity of the conjugacy between two one-dimensional maps (with possible singularities) becomes an important issue in the study of one-dimensional dynamical systems, in particular in the study of geometric Gibbs theory (see [11,15,16]).…”
Section: Introductionmentioning
confidence: 99%