Extremal problems for clamped plates under tension

TL;DR

This paper investigates extremal shape optimization problems for a biharmonic operator with tension, establishing that the ball minimizes the first eigenvalue and maximizes torsional rigidity under volume constraints.

Contribution

It proves that the ball is optimal for both the first eigenvalue minimization and torsional rigidity maximization problems for clamped plates under tension.

Findings

The ball minimizes the first eigenvalue among domains with fixed volume.

The ball maximizes torsional rigidity among domains with fixed volume.

The paper establishes sharp inequalities analogous to Szeg\

Abstract

We address extremum problems for spectral quantities associated with operators of the form $\Delta^2-\tau\Delta$ with Dirichlet boundary conditions, for non-negative values of $\tau$. The focus is on two shape optimisation problems: minimising the first eigenvalue; and maximising the torsional rigidity, both under volume constraint. We establish, on the one hand, a Szeg\H{o}-type inequality, that is, we show that among all domains having a first eigenfunction of fixed sign the ball minimises the corresponding first eigenvalue; on the other hand a Saint--Venant-type inequality, namely, a sharp upper bound on the torsional rigidity, again achieved by the ball. We further present other properties related to these operators and express the optimality condition associated with the minimisation of the first eigenvalue.