Let $\Omega$ be an open convex set in ${\mathbb R}^m$ with finite width, and
let $v_{\Omega}$ be the torsion function for $\Omega$, i.e. the solution of
$-\Delta v=1, v\in H_0^1(\Omega)$. An upper bound is obtained for the product
of $\Vert v_{\Omega}\Vert_{L^{\infty}(\Omega)}\lambda(\Omega)$, where
$\lambda(\Omega)$ is the bottom of the spectrum of the Dirichlet Laplacian
acting in $L^2(\Omega)$. The upper bound is sharp in the limit of a thinning
sequence of convex sets. For planar rhombi and isosceles triangles with area
$1$, it is shown that $\Vert v_{\Omega}\Vert_{L^{1}(\Omega)}\lambda(\Omega)\ge
\frac{\pi^2}{24}$, and that this bound is sharp.Comment: 12 pages, 4 figure

Berg, M. van den

Ferone, V.

Nitsch, C.

Trombetti, C.

English

arXiv

Let Ω be an open convex set in Rm with finite width, and let vΩ be the torsion function for Ω, i.e. the solution of −Δv=1,v∈H10(Ω). An upper bound is obtained for the product of ∥vΩ∥L∞(Ω)λ(Ω), where λ(Ω) is the bottom of the spectrum of the Dirichlet Laplacian acting in L2(Ω). The upper bound is sharp in the limit of a thinning sequence of convex sets. For planar rhombi and isosceles triangles with area 1, it is shown that ∥vΩ∥L1(Ω)λ(Ω)≥π224, and that this bound is shar

van den Berg, Michiel

Ferone, Vincenzo

Nitsch, Carlo

Trombetti, Cristina

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On a Pólya functional for rhombi, isosceles triangles, and thinning convex sets

Michiel van Den Berg

Vincenzo Ferone

Carlo Nitsch

Cristina Trombetti

Archivio della ricerca - Università degli studi di Napoli Federico II

On a Polya functional for rhombi, isosceles triangles, and thinning convex sets

On a P\'olya functional for rhombi, isosceles triangles, and thinning
  convex sets

On a P\'olya functional for rhombi, isosceles triangles, and thinning convex sets

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Archivio della ricerca - Università degli studi di Napoli Federico II