Loewner chains with quasiconformal extensions: an approximation approach

Abstract

A new approach in Loewner Theory proposed by Bracci, Contreras, D\'iaz-Madrigal and Gumenyuk provides a unified treatment of the radial and the chordal versions of the Loewner equations. In this framework, a generalized Loewner chain satisfies the differential equation ∂tft(z) = (z - τ(t))(1-τ(t)z)∂zft(z)p(z,t), where τ : [0,∞) D is measurable and p is called a Herglotz function. In this paper, we will show that if there exists a k ∈ [0,1) such that p satisfies |p(z,t) - 1| ≤ k |p(z,t) + 1| for all z ∈ D and almost all t ∈ [0,∞), then ft has a k-quasiconformal extension to the whole Riemann sphere for all t ∈ [0,∞). The radial case (τ =0) and the chordal case (τ=1) have been proven by Becker [J. Reine Angew. Math. 255 (1972), 23-43] and Gumenyuk and the author (Math. Z. 285 (2017), no.3, 1063--1089). In our theorem, no superfluous assumption is imposed on τ ∈ D. As a key foundation of our proof is an approximation method using the continuous dependence of evolution families.