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Hauptverfasser: De Fazio, Paolo, Miranda Jr, Michele
Format: Preprint
Veröffentlicht: 2025
Schlagworte:
Online-Zugang:https://arxiv.org/abs/2507.23427
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_version_ 1866918108413820928
author De Fazio, Paolo
Miranda Jr, Michele
author_facet De Fazio, Paolo
Miranda Jr, Michele
contents In this paper we study the heat content for sets with positive reach. In details, we investigate the asymptotic behavior of the heat content of bounded subsets of the Euclidean space with positive reach. The concept of positive reach was introduced by Federer in \cite{fed_1959} and widely developed in the following years (see for instance the recent book by Rataj and Zh{ä}le \cite{rat_zah_2019}). It extends the class of sets with smooth boundaries to include certain non-smooth and singular sets while still admitting a well-defined normal geometry. For such sets $E\subseteq\Rn$, we analyze the short-time asymptotics of the heat content $\|T_t\mathbbm{1}_E\|_2$, where $T_t\mathbbm{1}_E$ is the soluzion of the heat equation in $\Rn$ with initial condition $\mathbbm{1}_E$. The present paper is in the spirit of Angiuli, Massari and Miranda Jr.\cite{ang_mas_mir_2013}, but the technique's used here are completely different and also the final result is slightly different.
format Preprint
id arxiv_https___arxiv_org_abs_2507_23427
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Heat content asymptotics for sets with positive reach
De Fazio, Paolo
Miranda Jr, Michele
Analysis of PDEs
28A33, 49Q15
In this paper we study the heat content for sets with positive reach. In details, we investigate the asymptotic behavior of the heat content of bounded subsets of the Euclidean space with positive reach. The concept of positive reach was introduced by Federer in \cite{fed_1959} and widely developed in the following years (see for instance the recent book by Rataj and Zh{ä}le \cite{rat_zah_2019}). It extends the class of sets with smooth boundaries to include certain non-smooth and singular sets while still admitting a well-defined normal geometry. For such sets $E\subseteq\Rn$, we analyze the short-time asymptotics of the heat content $\|T_t\mathbbm{1}_E\|_2$, where $T_t\mathbbm{1}_E$ is the soluzion of the heat equation in $\Rn$ with initial condition $\mathbbm{1}_E$. The present paper is in the spirit of Angiuli, Massari and Miranda Jr.\cite{ang_mas_mir_2013}, but the technique's used here are completely different and also the final result is slightly different.
title Heat content asymptotics for sets with positive reach
topic Analysis of PDEs
28A33, 49Q15
url https://arxiv.org/abs/2507.23427