Rigidity, universality,and hyperbolicity of renormalization for critical circle maps with non-integer exponents
Abstract
We construct a renormalization operator which acts on analytic circle maps whose critical exponent α is not necessarily an odd integer 2n+1, n∈ N. When α=2n+1, our definition generalizes cylinder renormalization of analytic critical circle maps. In the case when α is close to an odd integer, we prove hyperbolicity of renormalization for maps of bounded type. We use it to prove universality and C1+α-rigidity for such maps.
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