In this paper, we prove a new extremal property of the Reuleaux triangle: it maximizes the Cheeger constant among all bodies of (same) constant width. The proof relies on a fine analysis of the optimality conditions satisfied by an optimal Reuleaux polygon together with an explicit upper bound for the inradius of the optimal domain. As a possible perspective, we conjecture that this maximal property of the Reuleaux triangle holds for the first eigenvalue of the p-Laplacian for any p between 1 and plus infinity (this paper covers the case p=1 whereas the case p=+∞ was already known).

A Blaschke-Lebesgue theorem for the Cheeger constant

Ilaria Lucardesi
In corso di stampa

Abstract

In this paper, we prove a new extremal property of the Reuleaux triangle: it maximizes the Cheeger constant among all bodies of (same) constant width. The proof relies on a fine analysis of the optimality conditions satisfied by an optimal Reuleaux polygon together with an explicit upper bound for the inradius of the optimal domain. As a possible perspective, we conjecture that this maximal property of the Reuleaux triangle holds for the first eigenvalue of the p-Laplacian for any p between 1 and plus infinity (this paper covers the case p=1 whereas the case p=+∞ was already known).
In corso di stampa
Henrot, Antoine; Lucardesi, Ilaria
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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/11568/1210929
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