An optimal control problem for a fourth-order variational inequality
Banach Center Publications, Tome 27 (1992) no. 1, pp. 225-231
Voir la notice de l'acte provenant de la source Institute of Mathematics Polish Academy of Sciences
An optimal control problem is considered where the state of the system is described by a variational inequality for the operator w → εΔ²w - φ(‖∇w‖²)Δw. A set of nonnegative functions φ is used as a control region. The problem is shown to have a solution for every fixed ε > 0. Moreover, the solvability of the limit optimal control problem corresponding to ε = 0 is proved. A compactness property of the solutions of the optimal control problems for ε > 0 and their relation with the limit problem are established. This type of operator arises in the theory of nonlinear plates, and the choice of a most suitable function φ is of interest for applications [2]. The problem of control of the function w has been studied in [4] for the operator under consideration, and some statements of this work will be used. Nonstationary problems with analogous operators were analyzed in [6,7]. Some general results on control of second-order variational inequalities can be found in [1]. The first section of this paper deals with the control problem for our fourth-order operator, the second considers a second-order operator, and the third studies the relationship between the solutions of the two problems.
A. Khludnev. An optimal control problem for a fourth-order variational inequality. Banach Center Publications, Tome 27 (1992) no. 1, pp. 225-231. doi: 10.4064/-27-1-225-231
@article{10_4064__27_1_225_231,
author = {A. Khludnev},
title = {An optimal control problem for a fourth-order variational inequality},
journal = {Banach Center Publications},
pages = {225--231},
year = {1992},
volume = {27},
number = {1},
doi = {10.4064/-27-1-225-231},
language = {en},
url = {http://geodesic.mathdoc.fr/articles/10.4064/-27-1-225-231/}
}
TY - JOUR AU - A. Khludnev TI - An optimal control problem for a fourth-order variational inequality JO - Banach Center Publications PY - 1992 SP - 225 EP - 231 VL - 27 IS - 1 UR - http://geodesic.mathdoc.fr/articles/10.4064/-27-1-225-231/ DO - 10.4064/-27-1-225-231 LA - en ID - 10_4064__27_1_225_231 ER -
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