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Autores principales: Fu, Haotong, Wang, Wei, Wu, Ke, Zhang, Zhifei
Formato: Preprint
Publicado: 2025
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Acceso en línea:https://arxiv.org/abs/2504.14880
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author Fu, Haotong
Wang, Wei
Wu, Ke
Zhang, Zhifei
author_facet Fu, Haotong
Wang, Wei
Wu, Ke
Zhang, Zhifei
contents In this paper, we investigate the stratification theory for ``suitable solutions" of harmonic map flows based on the spatial symmetry of tangent measures. Generally, suitable solutions are a category of solutions that satisfy both the localized energy inequality and the monotonicity formula. Building on the modifications and adjustments of quantitative stratifications and Reifenberg-rectifiable theory by Naber and Valtorta in the breakthrough research of harmonic maps (\emph{Ann. Math.} 185 (2017), 131-227), we confirm that each stratum in our model is rectifiable. Furthermore, for each time slice of the singular set, we establish the estimate of the Minkowski content and demonstrate its rectifiability, strengthening prior findings, which applied only to almost every time slice. Additionally, by making certain assumptions about the target manifolds to exclude specific tangent flows and measures, our analysis yields sharp improvements in the regularity of suitable solutions for harmonic map flows.
format Preprint
id arxiv_https___arxiv_org_abs_2504_14880
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Stratification and Rectifiability of Harmonic Map Flows via Tangent Measures
Fu, Haotong
Wang, Wei
Wu, Ke
Zhang, Zhifei
Analysis of PDEs
Differential Geometry
In this paper, we investigate the stratification theory for ``suitable solutions" of harmonic map flows based on the spatial symmetry of tangent measures. Generally, suitable solutions are a category of solutions that satisfy both the localized energy inequality and the monotonicity formula. Building on the modifications and adjustments of quantitative stratifications and Reifenberg-rectifiable theory by Naber and Valtorta in the breakthrough research of harmonic maps (\emph{Ann. Math.} 185 (2017), 131-227), we confirm that each stratum in our model is rectifiable. Furthermore, for each time slice of the singular set, we establish the estimate of the Minkowski content and demonstrate its rectifiability, strengthening prior findings, which applied only to almost every time slice. Additionally, by making certain assumptions about the target manifolds to exclude specific tangent flows and measures, our analysis yields sharp improvements in the regularity of suitable solutions for harmonic map flows.
title Stratification and Rectifiability of Harmonic Map Flows via Tangent Measures
topic Analysis of PDEs
Differential Geometry
url https://arxiv.org/abs/2504.14880