Thermodynamic formalism for entire transcendental maps with hyperbolic Baker Domains
Abstract
We provide a version of a thermodynamic formalism of entire transcendental maps that exhibit Baker domains, denoted as f, c: C C and defined by f, c(z)= c-(-1) c+ z- ez, where ∈ N, with ≥ 2 and c belongs to the disk D(, 1) in the complex plane. We show in particular the existence and uniqueness of conformal measures and that the Hausdorff dimension is the unique zero of the pressure function t P(t), for t>1, where Jr(f) is the radial Julia set.
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