Abstract
We consider the optimal control of singular nonlinear partial differential equation which is the distributional formulation of the multiphase Stefan type free boundary problem for the general second order parabolic equation. Boundary heat flux is the control parameter, and the optimality criteria consist of the minimization of the \(L_2\)-norm difference of the trace of the solution to the PDE problem at the final moment from the given measurement. Sequence of finite-dimensional optimal control problems is introduced through finite differences. We establish existence of the optimal control and prove the convergence of the sequence of discrete optimal control problems to the original problem both with respect to functional and control. Proofs rely on establishing a uniform \(L_{\infty }\) bound, and \(W_2^{1,1}\)-energy estimate fo the discrete nonlinear PDE problem with discontinuous coefficient.
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Abdulla, U.G., Cosgrove, E. Optimal Control of Multiphase Free Boundary Problems for Nonlinear Parabolic Equations. Appl Math Optim 84, 589–619 (2021). https://doi.org/10.1007/s00245-020-09655-6
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DOI: https://doi.org/10.1007/s00245-020-09655-6
Keywords
- Inverse multidimensional multiphase Stefan problem
- Quasilinear parabolic PDE with discontinuous coefficients
- Optimal control
- Method of finite differences
- Discrete optimal control problem
- Weak compactness
- Convergence in functional
- Convergence in control
- Maximal monotone graph