Conformal weldings in the Loewner equation and Weil--Petersson quasislit-disks
Abstract
A simple arc = γ(0, T], growing into the unit disk D from its boundary, generates a driving term and a conformal welding φ through the Loewner differential equation. When is the slit of a Weil--Petersson quasislit-disk D, the Loewner transform and its inverse have been well understood due to Y. Wang's work. We investigate the maps φ in this case, giving a description of in terms of φ.
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