Explicit Solutions for Distributed, Boundary and Distributed-Boundary Elliptic Optimal Control Problems

We consider a steady-state heat conduction problem in a multidimensional bounded domain Omega for the Poisson equation with constant internal energy g and mixed boundary conditions given by a constant temperature b in the portion Gamma_1 of the boundary and a constant heat flux q in the remaining po...

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Bibliographic Details
Published in:arXiv.org 2020-04
Main Authors: Bollati, Julieta, Gariboldi, Claudia M, Tarzia, Domingo A
Format: Article
Language:English
Subjects:
Boundary conditions
Conduction heating
Conductive heat transfer
Convergence
Heat
Heat flux
Heat transfer coefficients
Internal energy
Numerical methods
Optimal control
Poisson equation
Spherical shells
Steady state
Test procedures
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Summary:We consider a steady-state heat conduction problem in a multidimensional bounded domain Omega for the Poisson equation with constant internal energy g and mixed boundary conditions given by a constant temperature b in the portion Gamma_1 of the boundary and a constant heat flux q in the remaining portion Gamma_2 of the boundary. Moreover, we consider a family of steady-state heat conduction problems with a convective condition on the boundary Gamma_1 with heat transfer coefficient alpha and external temperature b. We obtain explicitly, for a rectangular domain in R^2, an annulus in R^2 and a spherical shell in R^3, the optimal controls, the system states and adjoint states for the following optimal control problems: a distributed control problem on the internal energy g, a boundary optimal control problem on the heat flux q, a boundary optimal control problem on the external temperature b and a distributed-boundary simultaneous optimal control problem on the source g and the flux q. These explicit solutions can be used for testing new numerical methods as a benchmark test. In agreement with theory, it is proved that the system state, adjoint state, optimal controls and optimal values corresponding to the problem with a convective condition on Gamma_1 converge, when alpha\to\infty, to the corresponding system state, adjoint state, optimal controls and optimal values that arise from the problem with a temperature condition on Gamma_1. Also, we analyze the order of convergence in each case, which turns out to be 1/alpha being new for these kind of elliptic optimal control problems.
ISSN:2331-8422