Fourth Order Saint-Venant Inequalities: Maximizing Compliance and Mean Deflection Among Clamped Plates

Mark S. Ashbaugh; Dorin Bucur; Richard S. Laugesen; Roméo Leylekian

doi:10.1007/s00220-025-05439-7

Fourth Order Saint-Venant Inequalities: Maximizing Compliance and Mean Deflection Among Clamped Plates

Mark S. Ashbaugh
, Dorin Bucur
, Richard S. Laugesen
, Roméo Leylekian

Mathematics

Research output: Contribution to journal › Article › peer-review

Abstract

We prove a fourth order analogue of the Saint-Venant inequality: the mean deflection of a clamped plate under uniform transverse load is maximal for the ball, among plates of prescribed volume in any dimension of space. The method works in the Euclidean space, the hyperbolic space, and the sphere. Similar results for clamped plates under small compression and for the compliance under non-uniform loads are proved to hold in two dimensional Euclidean space, with the higher dimensional and curved cases of those problems left open.

Original language	English (US)
Article number	256
Journal	Communications in Mathematical Physics
Volume	406
Issue number	10
Early online date	Sep 1 2025
DOIs	https://doi.org/10.1007/s00220-025-05439-7
State	Published - Oct 2025

ASJC Scopus subject areas

Statistical and Nonlinear Physics
Mathematical Physics

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10.1007/s00220-025-05439-7License: CC BY

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abstract = "We prove a fourth order analogue of the Saint-Venant inequality: the mean deflection of a clamped plate under uniform transverse load is maximal for the ball, among plates of prescribed volume in any dimension of space. The method works in the Euclidean space, the hyperbolic space, and the sphere. Similar results for clamped plates under small compression and for the compliance under non-uniform loads are proved to hold in two dimensional Euclidean space, with the higher dimensional and curved cases of those problems left open.",

author = "Ashbaugh, \{Mark S.\} and Dorin Bucur and Laugesen, \{Richard S.\} and Rom{\'e}o Leylekian",

note = "Mark S. Ashbaugh and Dorin Bucur did not receive support from any organization for the submitted work. Richard Laugesen{\textquoteright}s research was supported by grants from the Simons Foundation (\#964018) and the National Science Foundation (\#2246537). Rom{\'e}o Leylekian was partially supported by the Funda{\c c}{\~a}o para a Ci{\^e}ncia e a Tecnologia, I.P. (Portugal), through project doi.org/10.54499/UIDB/00208/2020.",

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AU - Laugesen, Richard S.

AU - Leylekian, Roméo

N1 - Mark S. Ashbaugh and Dorin Bucur did not receive support from any organization for the submitted work. Richard Laugesen’s research was supported by grants from the Simons Foundation (#964018) and the National Science Foundation (#2246537). Roméo Leylekian was partially supported by the Fundação para a Ciência e a Tecnologia, I.P. (Portugal), through project doi.org/10.54499/UIDB/00208/2020.

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N2 - We prove a fourth order analogue of the Saint-Venant inequality: the mean deflection of a clamped plate under uniform transverse load is maximal for the ball, among plates of prescribed volume in any dimension of space. The method works in the Euclidean space, the hyperbolic space, and the sphere. Similar results for clamped plates under small compression and for the compliance under non-uniform loads are proved to hold in two dimensional Euclidean space, with the higher dimensional and curved cases of those problems left open.

AB - We prove a fourth order analogue of the Saint-Venant inequality: the mean deflection of a clamped plate under uniform transverse load is maximal for the ball, among plates of prescribed volume in any dimension of space. The method works in the Euclidean space, the hyperbolic space, and the sphere. Similar results for clamped plates under small compression and for the compliance under non-uniform loads are proved to hold in two dimensional Euclidean space, with the higher dimensional and curved cases of those problems left open.

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Fourth Order Saint-Venant Inequalities: Maximizing Compliance and Mean Deflection Among Clamped Plates

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