Abstract
We consider the Riemann map gζ,w of the complex unit disk to the plane domain 𝕀[ζ] enclosed by the Jordan curve ζ and normalized by the conditions gζ,w(0) = w, g′ζ,w(0) > 0, where w is a point of 𝕀[ζ], and we present a nonlinear singular integral equation approach to prove that the nonlinear operator which takes the pair (ζ, w) to the map g(–1)ζ,w ○ ζ is real analytic in Schauder spaces.
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