The Logarithmic Sobolev inequality on non-compact self-shrinkers
In the paper we establish an optimal logarithmic Sobolev inequality for complete, non-compact, properly embedded self-shrinkers in the Euclidean space, which generalizes a recent result of Brendle \cite{Brendle22} for closed self-shrinkers. We first provide a proof for the logarithmic Sobolev inequa...
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Zusammenfassung: | In the paper we establish an optimal logarithmic Sobolev inequality for
complete, non-compact, properly embedded self-shrinkers in the Euclidean space,
which generalizes a recent result of Brendle \cite{Brendle22} for closed
self-shrinkers. We first provide a proof for the logarithmic Sobolev inequality
in the Euclidean space by using the Alexandrov-Bakelman-Pucci (ABP) method.
Then we use this approach to show an optimal logarithmic Sobolev inequality for
complete, non-compact, properly embedded self-shrinkers in the Euclidean space,
which is a sharp version of the result of Ecker in \cite{Ecker}. The proof is a
noncompact modification of Brendle's proof for closed submanifolds and has a
big potential to provide new inequalities in noncompact manifolds. |
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DOI: | 10.48550/arxiv.2410.13601 |