Poincaré and Sobolev inequalities with variable exponents and log-Holder continuity only at the boundary

arXiv - MATH - Classical Analysis and ODEs Pub Date : 2024-09-05 DOI:arxiv-2409.03660

David Cruz-Uribe, Fernando López-Garcí a, Ignacio Ojea

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Abstract

We prove Sobolev-Poincar\'e and Poincar\'e inequalities in variable Lebesgue spaces $L^{p(\cdot)}(\Omega)$, with $\Omega\subset{\mathbb R}^n$ a bounded John domain, with weaker regularity assumptions on the exponent $p(\cdot)$ that have been used previously. In particular, we require $p(\cdot)$ to satisfy a new \emph{boundary $\log$-H\"older condition} that imposes some logarithmic decay on the oscillation of $p(\cdot)$ towards the boundary of the domain. Some control over the interior oscillation of $p(\cdot)$ is also needed, but it is given by a very general condition that allows $p(\cdot)$ to be discontinuous at every point of $\Omega$. Our results follows from a local-to-global argument based on the continuity of certain Hardy type operators. We provide examples that show that our boundary $\log$-H\"older condition is essentially necessary for our main results. The same examples are adapted to show that this condition is not sufficient for other related inequalities. Finally, we give an application to a Neumann problem for a degenerate $p(\cdot)$-Laplacian.

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仅在边界上具有可变指数和 log-Holder 连续性的 Poincaré 和 Sobolev 不等式

我们证明了可变Lebesguespaces $L^{p(\cdot)}(\Omega)$中的Sobolev-Poincar\'e 和 Poincar\'e 不等式，其中$\Omega\subset{mathbb R}^n$是一个有界的Johndomain，对指数$p(\cdot)$的正则性假设比以前使用的要弱。特别是，我们要求$p(\cdot)$满足一个新的emph{边界$\log$-H\"旧条件}，该条件对$p(\cdot)$向域边界的振荡施加了一些对数衰减。还需要对$p(\cdot)$的内部振荡进行一些控制，但这是由一个非常一般的条件给出的，它允许$p(\cdot)$在$\Omega$的每一点上都是不连续的。我们的结果来自基于某些哈代类型算子连续性的局部到全局论证。我们举例说明，我们的边界$\log$-H\"旧条件对于我们的主要结果是必要的。同样的例子也可以证明，这个条件对于其他相关的不等式来说是不充分的。最后，我们给出了一个退化$p(\cdot)$拉普拉斯的诺伊曼问题的应用。

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arXiv - MATH - Classical Analysis and ODEs

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