Open AccessOn the First-Order Shape Derivative of the Kohn-Vogelius Cost Functional of the Bernoulli Problem
Author(s) -
Jerico B. Bacani,
G. Peichl
Publication year - 2013
Publication title -
abstract and applied analysis
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 0.228
H-Index - 56
eISSN - 1687-0409
pISSN - 1085-3375
DOI - 10.1155/2013/384320
Subject(s) - mathematics , bernoulli's principle , boundary value problem , neumann boundary condition , shape optimization , domain (mathematical analysis) , derivative (finance) , dirichlet distribution , computation , boundary (topology) , mathematical optimization , mathematical analysis , algorithm , physics , finite element method , financial economics , engineering , economics , thermodynamics , aerospace engineering
The exterior Bernoulli free boundary problem is being considered. The solution to the problem is studied via shape optimization techniques. The goal is to determine a domain having a specific regularity that gives a minimum value for the Kohn-Vogelius-type cost functional while simultaneously solving two PDE constraints: a pure Dirichlet boundary value problem and a Neumann boundary value problem. This paper focuses on the rigorous computation of the first-order shape derivative of the cost functional using the Hölder continuity of the state variables and not the usual approach which uses the shape derivatives of states
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