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Main Authors: Aldrigo, Pietro, Balogh, Zoltán M.
Format: Preprint
Published: 2025
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Online Access:https://arxiv.org/abs/2504.05879
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author Aldrigo, Pietro
Balogh, Zoltán M.
author_facet Aldrigo, Pietro
Balogh, Zoltán M.
contents We establish Pólya-Szegő-type inequalities (PSIs) for Sobolev-functions defined on a regular $n$-dimensional submanifold $Σ$ (possibly with boundary) of a $(n+m)$-dimensional Euclidean space, under explicit upper bounds of the total mean curvature. The $p$-Sobolev and Gagliardo-Nirenberg inequalities, as well as the spectral gap in $W^{1,p}_0(Σ)$ are derived as corollaries. Using these PSIs, we prove a sharp $p$-Log-Sobolev inequality for minimal submanifolds in codimension one and two. The asymptotic sharpness of both the multiplicative constant appearing in PSIs and the assumption on the total mean curvature bound as $n\to \infty$ is provided. A second equivalent version of our PSIs is presented in the appendix of this paper, introducing the notion of model space $(\mathbb{R}^+,\mathfrak{m}_{n,K})$ of dimension $n$ and total mean curvature bounded by $K$.
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publishDate 2025
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spellingShingle Pólya-Szegő inequalities on submanifolds with small total mean curvature
Aldrigo, Pietro
Balogh, Zoltán M.
Differential Geometry
We establish Pólya-Szegő-type inequalities (PSIs) for Sobolev-functions defined on a regular $n$-dimensional submanifold $Σ$ (possibly with boundary) of a $(n+m)$-dimensional Euclidean space, under explicit upper bounds of the total mean curvature. The $p$-Sobolev and Gagliardo-Nirenberg inequalities, as well as the spectral gap in $W^{1,p}_0(Σ)$ are derived as corollaries. Using these PSIs, we prove a sharp $p$-Log-Sobolev inequality for minimal submanifolds in codimension one and two. The asymptotic sharpness of both the multiplicative constant appearing in PSIs and the assumption on the total mean curvature bound as $n\to \infty$ is provided. A second equivalent version of our PSIs is presented in the appendix of this paper, introducing the notion of model space $(\mathbb{R}^+,\mathfrak{m}_{n,K})$ of dimension $n$ and total mean curvature bounded by $K$.
title Pólya-Szegő inequalities on submanifolds with small total mean curvature
topic Differential Geometry
url https://arxiv.org/abs/2504.05879