On the Conformal Energy of Quasisymmetric and Quasim\"obius Mappings

Abstract

This article identifies the conformal energy (or mean distortion) of extremal mappings of finite distortion with a given quasisymmetric mapping of the circle as boundary data. The conformal energy of go: is equationenergy E(go)=-14π2S× S |go(ζ)-go(η)| \: dζ dη < ∞ equation We give explicit formulae for the conformal energy of circle homeomorphisms directly in terms of their data. As an example, if go: S → S is an η-quasi-M\"obius self homeomorphism of the unit circle, then align* E(go) ≤ 1π ∫π/20 η [ 2(t/2)] \,(t) \; dt align* This estimate is sharp. Additionally we show how a circle homeomorphism of finite conformal energy can be uniformly approximated on by mappings of strictly smaller energy.