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Main Authors: Chata, Juan Carlos Ortiz, Petitta, Francesco
Format: Preprint
Published: 2024
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Online Access:https://arxiv.org/abs/2407.13411
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author Chata, Juan Carlos Ortiz
Petitta, Francesco
author_facet Chata, Juan Carlos Ortiz
Petitta, Francesco
contents In this paper we analyze the asymptotic behaviour as $p\to 1^+$ of solutions $u_p$ to $$ \left\{ \begin{array}{rclr} -Δ_pu&=&λ|\nabla u|^{p-2}\nabla u\cdot\frac{x}{|x|^2}+ f&\quad \mbox{ in } Ω,\\ u_p&=&0 &\quad \mbox{ on }\partialΩ, \end{array}\right. $$ where $Ω$ is a bounded open subset of $\mathbb{R}^N$ with Lipschitz boundary containing the origin, $λ\in\mathbb{R}$, and $f$ is a nonnegative datum in $L^{N,\infty}(Ω)$. As a consequence, under suitable smallness assumptions on $f$ and $λ$, we show sharp existence results of bounded solutions to the Dirichlet problems $$\begin{cases} \displaystyle - Δ_{1} u = λ\frac{D u}{|D u|}\cdot \frac{x}{|x|^2}+f & \text{in}\, Ω, u=0 & \text{on}\ \partial Ω, \end{cases} $$ where $\displaystyle Δ_{1}u=\hbox{div}\,\left(\frac{Du}{|Du|}\right) $ is the $1$-Laplacian operator. The case of a generic drift term in $L^{N,\infty}(Ω)$ is also considered. Explicits examples are given in order to show the optimality of the main assumptions on the data.
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spellingShingle Existence, non-existence and degeneracy of limit solutions to $p$-Laplace problems involving Hardy potentials as $p\to1^+$. The case of a critical drift
Chata, Juan Carlos Ortiz
Petitta, Francesco
Analysis of PDEs
In this paper we analyze the asymptotic behaviour as $p\to 1^+$ of solutions $u_p$ to $$ \left\{ \begin{array}{rclr} -Δ_pu&=&λ|\nabla u|^{p-2}\nabla u\cdot\frac{x}{|x|^2}+ f&\quad \mbox{ in } Ω,\\ u_p&=&0 &\quad \mbox{ on }\partialΩ, \end{array}\right. $$ where $Ω$ is a bounded open subset of $\mathbb{R}^N$ with Lipschitz boundary containing the origin, $λ\in\mathbb{R}$, and $f$ is a nonnegative datum in $L^{N,\infty}(Ω)$. As a consequence, under suitable smallness assumptions on $f$ and $λ$, we show sharp existence results of bounded solutions to the Dirichlet problems $$\begin{cases} \displaystyle - Δ_{1} u = λ\frac{D u}{|D u|}\cdot \frac{x}{|x|^2}+f & \text{in}\, Ω, u=0 & \text{on}\ \partial Ω, \end{cases} $$ where $\displaystyle Δ_{1}u=\hbox{div}\,\left(\frac{Du}{|Du|}\right) $ is the $1$-Laplacian operator. The case of a generic drift term in $L^{N,\infty}(Ω)$ is also considered. Explicits examples are given in order to show the optimality of the main assumptions on the data.
title Existence, non-existence and degeneracy of limit solutions to $p$-Laplace problems involving Hardy potentials as $p\to1^+$. The case of a critical drift
topic Analysis of PDEs
url https://arxiv.org/abs/2407.13411