An abstract setting for differential Riccati equations in optimal control problems for hyperbolic/Petrowski-type P. D. E. s with boundary control and slightly smoothing observation.
Triggiani, R. (1996)
Abstract and Applied Analysis
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Displaying similar documents to “Optimal regularity and optimal control of a thermoelastic structural acoustic model with point control and clamped boundary conditions”
An abstract setting for differential Riccati equations in optimal control problems for hyperbolic/Petrowski-type P. D. E. s with boundary control and slightly smoothing observation.
Control-theoretic properties of structural acoustic models with thermal effects, II. Trace regularity results
Francesca Bucci (2008)
Applicationes Mathematicae
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We consider a structural acoustic problem with the flexible wall modeled by a thermoelastic plate, subject to Dirichlet boundary control in the thermal component. We establish sharp regularity results for the traces of the thermal variable on the boundary in case the system is supplemented with clamped mechanical boundary conditions. These regularity estimates are most crucial for validity of the optimal control theory developed by Acquistapace et al. [Adv. Differential Equations, 2005],...
Existence and regularity of optimal solution for a dead oil isotherm problem.
Sidi Ammi, Moulay Rchid, Torres, Delfim F.M. (2007)
APPS. Applied Sciences
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-regularity of the boundary to boundary operator for hyperbolic and Petrowski PDEs.
Lasiecka, I., Triggiani, R. (2003)
Abstract and Applied Analysis
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Regularity and optimal control of quasicoupled and coupled heating processes
Jiří Jarušek (1996)
Applications of Mathematics
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Sufficient conditions for the stresses in the threedimensional linearized coupled thermoelastic system including viscoelasticity to be continuous and bounded are derived and optimization of heating processes described by quasicoupled or partially linearized coupled thermoelastic systems with constraints on stresses is treated. Due to the consideration of heating regimes being “as nonregular as possible” and because of the well-known lack of results concerning the classical regularity...
Factor spaces and implications of Kirchhoff equations with clamped boundary conditions.
Lasiecka, Irena, Triggiani, Roberto (2001)
Abstract and Applied Analysis
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Regularity along optimal trajectories of the value function of a Mayer problem
Carlo Sinestrari (2010)
ESAIM: Control, Optimisation and Calculus of Variations
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We consider an optimal control problem of Mayer type and prove that, under suitable conditions on the system, the value function is differentiable along optimal trajectories, except possibly at the endpoints. We provide counterexamples to show that this property may fail to hold if some of our conditions are violated. We then apply our regularity result to derive optimality conditions for the trajectories of the system.
Optimal regularity of lower dimensional obstacle problems.
Athanasopoulos, I., Caffarelli, L.A. (2004)
Journal of Mathematical Sciences (New York)
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The non-standard LQR problem for boundary control systems.
Bucci, F. (1998)
Rendiconti del Seminario Matematico
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Optimal control of a frictionless contact problem with normal compliance
Arezki Touzaline (2018)
Commentationes Mathematicae Universitatis Carolinae
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We consider a mathematical model which describes a contact between an elastic body and a foundation. The contact is frictionless with normal compliance. The goal of this paper is to study an optimal control problem which consists of leading the stress tensor as close as possible to a given target, by acting with a control on the boundary of the body. We state an optimal control problem which admits at least one solution. Next, we establish an optimality condition corresponding to a regularization...