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Main Authors: Jeon, Junekey, Zlatos, Andrej
Format: Preprint
Published: 2025
Subjects:
Online Access:https://arxiv.org/abs/2509.01687
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author Jeon, Junekey
Zlatos, Andrej
author_facet Jeon, Junekey
Zlatos, Andrej
contents We prove local well-posedness as well as singularity formation for the g-SQG patch model on the plane (so on a domain without a boundary), with $α\in(0,\frac 16]$ and patches being allowed to touch each other. We do this by bypassing any auxiliary contour equations and tracking patch boundary curves directly instead of their parametrizations. In our results, which are sharp in terms of $α$, the patch boundaries have $L^2$ curvatures and a singularity occurs when at least one of these $L^2$-norms blows up in finite time.
format Preprint
id arxiv_https___arxiv_org_abs_2509_01687
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Well-Posedness and Finite Time Singularity for Touching g-SQG Patches on the Plane
Jeon, Junekey
Zlatos, Andrej
Analysis of PDEs
We prove local well-posedness as well as singularity formation for the g-SQG patch model on the plane (so on a domain without a boundary), with $α\in(0,\frac 16]$ and patches being allowed to touch each other. We do this by bypassing any auxiliary contour equations and tracking patch boundary curves directly instead of their parametrizations. In our results, which are sharp in terms of $α$, the patch boundaries have $L^2$ curvatures and a singularity occurs when at least one of these $L^2$-norms blows up in finite time.
title Well-Posedness and Finite Time Singularity for Touching g-SQG Patches on the Plane
topic Analysis of PDEs
url https://arxiv.org/abs/2509.01687