English

A reverse Holder inequality for extremal Sobolev functions

Analysis of PDEs 2016-02-02 v1

Abstract

Let n2n \geq 2, let ΩRn\Omega \subset \mathbf{R}^n be a bounded domain with smooth boundary, and let 1p21 \leq p \leq 2. We prove a reverse-Holder inequality for functions uu realizing the best constant in the Sobolev inequality, that is Cp(Ω)=inf{Ωv2(Ωvp)2/p}=Ωu2(Ωup)2/p.\mathcal{C}_p(\Omega) = \inf \left \{ \frac{\int_\Omega |\nabla v|^2}{\left ( \int_\Omega |v|^p \right )^{2/p}} \right \} = \frac{\int_\Omega |\nabla u|^2}{\left ( \int_\Omega |u|^p \right )^{2/p}}. Our inequality has the form uLpKuLq\| u \|_{L^p} \geq K \| u \|_{L^q} for any q>pq > p, where KK depends only on nn, pp, qq, and Cp(Ω)\mathcal{C}_p(\Omega). This result generalizes work of Chiti, regarding the first Dirichlet eigenfunction of the Laplacian, and of van den Berg, regarding the torsion function.

Keywords

Cite

@article{arxiv.1403.7355,
  title  = {A reverse Holder inequality for extremal Sobolev functions},
  author = {Tom Carroll and Jesse Ratzkin},
  journal= {arXiv preprint arXiv:1403.7355},
  year   = {2016}
}

Comments

10 pages

R2 v1 2026-06-22T03:37:09.598Z