Critical Lengths of Steklov Eigenvalues of Hypersurfaces of Revolution in Euclidean Space

Antoine Métras; Léonard Tschanz

doi:10.1080/10586458.2024.2410967

Critical Lengths of Steklov Eigenvalues of Hypersurfaces of Revolution in Euclidean Space

Antoine Métras, Léonard Tschanz^*

^*Corresponding author for this work

School of Mathematics

Research output: Contribution to journal › Article (Academic Journal) › peer-review

Abstract

We study the Steklov problem on hypersurfaces of revolution with two boundary components in Euclidean space and focus on the phenomenon of critical length, at which a Steklov eigenvalue is maximized. In this article, we conjecture that, in any dimension, there is a finite number of infinite critical length. To investigate this, we develop an algorithm to efficiently perform numerical experiments, providing support to our conjecture. Furthermore, we prove the conjecture in dimension n = 3 and n = 4.

Original language	English
Pages (from-to)	728-744
Number of pages	17
Journal	Experimental Mathematics
Volume	34
Issue number	4
Early online date	11 Oct 2024
DOIs	https://doi.org/10.1080/10586458.2024.2410967
Publication status	Published - 2 Oct 2025

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title = "Critical Lengths of Steklov Eigenvalues of Hypersurfaces of Revolution in Euclidean Space",

abstract = "We study the Steklov problem on hypersurfaces of revolution with two boundary components in Euclidean space and focus on the phenomenon of critical length, at which a Steklov eigenvalue is maximized. In this article, we conjecture that, in any dimension, there is a finite number of infinite critical length. To investigate this, we develop an algorithm to efficiently perform numerical experiments, providing support to our conjecture. Furthermore, we prove the conjecture in dimension n = 3 and n = 4.",

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T1 - Critical Lengths of Steklov Eigenvalues of Hypersurfaces of Revolution in Euclidean Space

AU - Métras, Antoine

AU - Tschanz, Léonard

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Y1 - 2025/10/2

N2 - We study the Steklov problem on hypersurfaces of revolution with two boundary components in Euclidean space and focus on the phenomenon of critical length, at which a Steklov eigenvalue is maximized. In this article, we conjecture that, in any dimension, there is a finite number of infinite critical length. To investigate this, we develop an algorithm to efficiently perform numerical experiments, providing support to our conjecture. Furthermore, we prove the conjecture in dimension n = 3 and n = 4.

AB - We study the Steklov problem on hypersurfaces of revolution with two boundary components in Euclidean space and focus on the phenomenon of critical length, at which a Steklov eigenvalue is maximized. In this article, we conjecture that, in any dimension, there is a finite number of infinite critical length. To investigate this, we develop an algorithm to efficiently perform numerical experiments, providing support to our conjecture. Furthermore, we prove the conjecture in dimension n = 3 and n = 4.

U2 - 10.1080/10586458.2024.2410967

DO - 10.1080/10586458.2024.2410967

M3 - Article (Academic Journal)

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VL - 34

SP - 728

EP - 744

JO - Experimental Mathematics

JF - Experimental Mathematics

IS - 4

ER -

Critical Lengths of Steklov Eigenvalues of Hypersurfaces of Revolution in Euclidean Space

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