Thermodynamic formalism and hyperbolic Baker domains: Real-analyticity of the Hausdorff dimension
Abstract
We consider the family of entire maps given by f,c(z)=+c-(-1) c-ez, where c∈ D(,1) and ∈ N, ≥2. By using the property of f,c to be dynamically projected to an infinite cylinder C/2π I Z, where the thermodynamic formalism tools are well-defined, we prove as a main result on this work, the real-analyticity of the map c HD(Jr(f,c)), here Jr(f,c) is the radial Julia set.
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