Hölder continuity of Green function for simply connected domains

Question

I read in a paper by E. A. Rakhmanov "Orthogonal Polynomials and S-curves" the following statement, in Lemma 9.9 therein, which I state here in my words.

Under the standard hypotheses for the Riemann mapping theorem, if $\Omega =\widehat{ \mathbb C}\setminus \mathcal K$ is a simply connected domain (of the Riemann sphere), then the Green's potential $G(z)$ of $\Omega$ (i.e. $G(z)=0$ on $\mathcal K$ and $G(z) \simeq \ln |z|$ at infinity) satisfies $$ G(z) \leq \sqrt{ \frac{\operatorname{dist}(z,\mathcal K)}{\operatorname{Cap}(\mathcal K)}} $$ where $\operatorname{Cap}(\mathcal K)$ is the capacity. I tried to follow the proof but it invokes a Theorem 1 Ch. IV of Goluzin's book, which seemingly has nothing to do with the property where it is used.

Question: is such an inequality proven somewhere else (or provable)? I am thinking of Köbe 1/4 theorem….

Note that the statement should not rely on any regularity whatsoever of $\Omega$. It would seem to me that this should be some very classical result (and if true, a quite nice one at that).

Answer 1

Scaling $\mathcal K$ by a factor $1/Cap(\mathcal K)$, we can assume $Cap(\mathcal{K})=1$. In this case the estimate $$ G(z) \leq C \sqrt{ {\rm dist}(z,\mathcal K)} $$ indeed follows from Koebe-type inequalities. This is explained for instance in the book Complex Dynamics by Carleson and Gamelin, see the second paragraph of p.139.

The claim is that one can take $C=1$, however. For that I am not sure, I am a bit skeptical.

Answer 2

The inequality is correct and here is the proof, reconstructed after the quoted paper. You need the inequality here: $$ {\rm dist}(z,\mathcal K) = \min_{|\rho|=1} |F(\zeta)-F(\rho)| \geq C \frac{(1-|\zeta|)^2}{|\zeta|} $$ Here $z=F(\zeta) = C \zeta +a_0 + \mathcal O(\zeta^{-1})$ is the uniformizing map of the complement of $\mathcal K$ and $C$ its capacity. The Green’s potential is related to $\zeta$ as $$ {\rm e}^{G(z)} = |\zeta|$$. So the inequality reads, setting $\delta = {\rm dist} (z,\mathcal K)$, $$ \frac {\delta}{{\rm Cap}(\mathcal K)}\geq 4\sinh(G/2)^2\geq G^2. $$ Done!. Thanks to all.