On quadratic optimization in distributed parameter systems
- 1 April 1971
- journal article
- Published by Institute of Electrical and Electronics Engineers (IEEE) in IEEE Transactions on Automatic Control
- Vol. 16 (2) , 153-159
- https://doi.org/10.1109/tac.1971.1099682
Abstract
Systems described by parabolic partial differential equations are formulated as ordinary differential equations in a Hilbert space. Quadratic cost criteria are then formulated as inner products on this Hilbert space. Existence of an optimal control is proved both in the case where the system operator is "coercive" and in the case where the system operator is the infinitesimal generator of a semigroup of operators. The optimal control is given by a linear state feedback law in which the feedback operator is shown to be the bounded positive self-adjoint solution of a nonlinear operator equation of the Riccati type.Keywords
This publication has 4 references indexed in Scilit:
- The Classification of Diagrams in Perturbation TheoryAnnals of Physics, 1995
- The Quadratic Criterion for Distributed SystemsSIAM Journal on Control, 1969
- Optimal Control Problems in Banach SpacesJournal of the Society for Industrial and Applied Mathematics Series A Control, 1965
- Control of Distributed Parameter Systems1 1This research was supported in part by the United States Air Force through Flight Dynamics Laboratory, Research and Technology Division, Wright-Patterson Air Force Base, under contract No. AF 33(657)-11545.Published by Elsevier ,1964