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REGULARITY OF AML FUNCTIONS IN TWO-DIMENSIONAL NORMED SPACES

Part of: Partial differential equations Real functions

Published online by Cambridge University Press:  20 May 2022

SEBASTIÁN TAPIA-GARCÍA Open the ORCID record for SEBASTIÁN TAPIA-GARCÍA [Opens in a new window]
SEBASTIÁN TAPIA-GARCÍA*
Affiliation:
Institute de Mathématique de Bordeaux, IMB (CNRS UMR 5251), Université de Bordeaux, Cours de la Liberation 351, Talence, France and Departamento de Ingeniería Matemática, CMM (CNRS IRL 2807), Universidad de Chile, Beauchef 851, Santiago, Chile
*
e-mail: stapia@dim.uchile.cl
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Abstract

Savin [‘ $\mathcal {C}^{1}$ regularity for infinity harmonic functions in two dimensions’, Arch. Ration. Mech. Anal. 3(176) (2005), 351–361] proved that every planar absolutely minimizing Lipschitz (AML) function is continuously differentiable whenever the ambient space is Euclidean. More recently, Peng et al. [‘Regularity of absolute minimizers for continuous convex Hamiltonians’, J. Differential Equations 274 (2021), 1115–1164] proved that this property remains true for planar AML functions for certain convex Hamiltonians, using some Euclidean techniques. Their result can be applied to AML functions defined in two-dimensional normed spaces with differentiable norm. In this work we develop a purely non-Euclidean technique to obtain the regularity of planar AML functions in two-dimensional normed spaces with differentiable norm.

Keywords

regularity of Lipschitz functionsabsolutely minimizing Lipschitz functionsfinite normed spaces

MSC classification

Primary: 35B65: Smoothness and regularity of solutions
Secondary: 26A16: Lipschitz (Hölder) classes
Type
Research Article
Information
Journal of the Australian Mathematical Society , Volume 114 , Issue 3 , June 2023 , pp. 406 - 430
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Copyright
© The Author(s), 2022. Published by Cambridge University Press on behalf of Australian Mathematical Publishing Association Inc.

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Footnotes

Communicated by Florica Cirstea

The author was supported by ANID-PFCHA/Doctorado Nacional/2018-21181905 and by CMM (IRL CNRS 2807), Basal grant: AFB170001.

References

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