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Main Authors: Wang, Y. -Y., Xiang, C. -L., Zheng, G. -F.
Format: Preprint
Published: 2025
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Online Access:https://arxiv.org/abs/2509.24587
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_version_ 1866912614987071488
author Wang, Y. -Y.
Xiang, C. -L.
Zheng, G. -F.
author_facet Wang, Y. -Y.
Xiang, C. -L.
Zheng, G. -F.
contents In this note, we study compactness and regularity theory of minimizing intrinsic fractional harmonic mappings introduced by Moser and Roberts. Based on the partial regularity theory of Moser and Roberts, we first use the modified Luckhaus lemma of Roberts to deduce compactness of these mappings, and then develop volume estimates of singular sets by the quantitative stratification theory of Cheeger and Naber. Combining these two results lead to a global regularity estimates which, in turn, allow us to obtain an improvement of the dimension estimate of singular sets.
format Preprint
id arxiv_https___arxiv_org_abs_2509_24587
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Quantitative regularity for minimizing intrinsic fractional harmonic maps
Wang, Y. -Y.
Xiang, C. -L.
Zheng, G. -F.
Analysis of PDEs
In this note, we study compactness and regularity theory of minimizing intrinsic fractional harmonic mappings introduced by Moser and Roberts. Based on the partial regularity theory of Moser and Roberts, we first use the modified Luckhaus lemma of Roberts to deduce compactness of these mappings, and then develop volume estimates of singular sets by the quantitative stratification theory of Cheeger and Naber. Combining these two results lead to a global regularity estimates which, in turn, allow us to obtain an improvement of the dimension estimate of singular sets.
title Quantitative regularity for minimizing intrinsic fractional harmonic maps
topic Analysis of PDEs
url https://arxiv.org/abs/2509.24587