Non-convexity of extremal length

Authors

  • Nathaniel Sagman University of Luxembourg
DOI: https://doi.org/10.54330/afm.138339

Keywords:

Teichmüller theory for Riemann surfaces, minimal surfaces in differential geometry, surfaces with prescribed mean curvature, harmonic functions on Riemann surfaces

Abstract

With respect to every Riemannian metric, the Teichmüller metric, and the Thurston metric on Teichmüller space, we show that there exist measured foliations on surfaces whose extremal length functions are not convex. The construction uses harmonic maps to \(\mathbb{R}\)-trees and minimal surfaces in \(\mathbb{R}^n\).
Issue
Vol. 48 No. 2 (2023)
Section
Articles

Published

2023-11-01

How to Cite

Sagman, N. (2023). Non-convexity of extremal length. Annales Fennici Mathematici, 48(2), 691–702. https://doi.org/10.54330/afm.138339

Copyright (c) 2023 Annales Fennici Mathematici

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