Quasiconformal parametrization of metric surfaces with small dilatation

Abstract

We verify a conjecture of Rajala: if (X,d) is a metric surface of locally finite Hausdorff 2-measure admitting some (geometrically) quasiconformal parametrization by a simply connected domain ⊂ R2, then there exists a quasiconformal mapping f: X → satisfying the modulus inequality 2π-1Mod ≤ Mod f ≤ 4π-1Mod for all curve families in X. This inequality is the best possible. Our proof is based on an inequality for the area of a planar convex body under a linear transformation which attains its Banach-Mazur distance to the Euclidean unit ball.