Rigidity for circle diffeomorphisms with breaks satisfying a Zygmund smoothness condition
Abstract
Let f and f be two circle diffeomorphisms with a break point, with the same irrational rotation number of bounded type, the same size of the break c and satisfying a certain Zygmund type smoothness condition depending on a parameter γ>2. We prove that under a certain condition imposed on the break size c, the diffeomorphisms f and f are C1+ωγ-smoothly conjugate to each other, where ωγ(δ)=| δ|-(γ/2-1).
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