Variations of Constrained Domain Functionals Associated with Boundary-Value Problems |
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| Authors: | Huang C. Miller D. |
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| Affiliation: | (1) Department of Mathematics and Statistics, Wright State University, Dayton, Ohio;(2) Department of Mathematics and Statistics, Wright State University, Dayton, Ohio |
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| Abstract: | ![]()
We study variational formulas for maximizers for domain functionalsF(x0, u(x0)), x0  , and  F(x,u(x))dxover all Lipschitz domains satisfying the constraintg(x) dx=1. Here, u is the solution ofa diffusion equation in . Functional variations arecomputed using domain variations which preserve the constraint exactly. Weshow that any maximizer solves a moving boundary problem for the diffusionequation. Further, we show that, for problems with symmetry, the optimaldomains are balls. |
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| Keywords: | Domain functionals boundary-value problems domain variations shape optimization |
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