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Autore principale: Tsubouchi, Shuntaro
Natura: Preprint
Pubblicazione: 2024
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Accesso online:https://arxiv.org/abs/2402.04951
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author Tsubouchi, Shuntaro
author_facet Tsubouchi, Shuntaro
contents This paper is concerned with the gradient continuity for the parabolic $(1,\,p)$-Laplace equation. In the supercritical case $\frac{2n}{n+2}<p<\infty$, where $n\ge 2$ denotes the space dimension, this gradient regularity result has been proved recently by the author. In this paper, we would like to prove that the same regularity holds even for the subcritical case $1<p\le \frac{2n}{n+2}$ with $n\ge 3$, on the condition that a weak solution admits the $L^{s}$-integrability with $s>n(2-p)/p$. The gradient continuity is proved, similarly to the supercritical case, once the local gradient bounds of solutions are verified. Hence, this paper mainly aims to show the local boundedness of a solution and its gradient by Moser's iteration. The proof is completed by considering a parabolic approximate problem, and showing a priori gradient estimates of a bounded weak solution to the relaxed equation.
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id arxiv_https___arxiv_org_abs_2402_04951
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Gradient continuity for the parabolic $(1,\,p)$-Laplace equation under the subcritical case
Tsubouchi, Shuntaro
Analysis of PDEs
This paper is concerned with the gradient continuity for the parabolic $(1,\,p)$-Laplace equation. In the supercritical case $\frac{2n}{n+2}<p<\infty$, where $n\ge 2$ denotes the space dimension, this gradient regularity result has been proved recently by the author. In this paper, we would like to prove that the same regularity holds even for the subcritical case $1<p\le \frac{2n}{n+2}$ with $n\ge 3$, on the condition that a weak solution admits the $L^{s}$-integrability with $s>n(2-p)/p$. The gradient continuity is proved, similarly to the supercritical case, once the local gradient bounds of solutions are verified. Hence, this paper mainly aims to show the local boundedness of a solution and its gradient by Moser's iteration. The proof is completed by considering a parabolic approximate problem, and showing a priori gradient estimates of a bounded weak solution to the relaxed equation.
title Gradient continuity for the parabolic $(1,\,p)$-Laplace equation under the subcritical case
topic Analysis of PDEs
url https://arxiv.org/abs/2402.04951