On a theorem of Baernstein

Abstract

In the paper [B2], Baernstein constructs a simply connected domain $\Omega$ in the plane for which the conformal mapping $f$ of $\Omega$ into the unit disc $\Delta$ satisfies $$\int_{\mathbf{R} \cap \Omega} |f'(z)|^p |dz| = \infty,$$ for some $p ∈ (1,2)$, where $\mathbf R$ is the real line.

This gives a counterexample to a conjecture stating that for any simply connected domain $\Omega$ in the plane, all the above integrals are finite for any $1 \lt p \lt 2$.

In this paper, we give a conceptual proof of the basic estimate of Baenstein.