Calculus of Variations and Geometric Measure Theory
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G. Buttazzo - S. Nazarov

Optimal location of support points in the Kirchhoff plate

created by buttazzo on 09 Oct 2017

[BibTeX]

Published Paper

Inserted: 9 oct 2017

Journal: In "Variational Analysis and Aerospace Engineering: Mathematical Challenges for Aerospace Design'', Springer Optimization and Its Applications
Volume: 66
Pages: 93-116
Year: 2012
Doi: 10.1007/978-1-4614-2435-2_5
Links: paper at the Springer web site

Abstract:

The Dirichlet problem for the bi-harmonic equation is considered as the Kirchhoff model of an isotropic elastic plate clamped at its edge. The plate is supported at certain points $P^1,\dots,P^J$, that is the deflexion $u(x)$ satisfies the Sobolev point conditions $u(P^1)=\dots=u(P^J)=0$. The optimal location of the support points is discussed such that either the compliance functional, or the minimal deflexion functional attains its minimum.

Keywords: compliance, optimization, Kirchhoff plate, minimal deflexion, support points, Sobolev point conditions, potential energy

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