Article
MSC:
47H19,
49A29,
49A34,
49J40,
73F15,
73K10,
73V25,
73k40,
74Hxx | MR 1152158 | Zbl 0772.49008 | DOI: 10.21136/AM.1992.104492
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Keywords:
optimal control; pseudoparabolic variational inequality; convex set; penalization; viscoelastic plate; thickness; obstacle; elliptic operators
optimal control; pseudoparabolic variational inequality; convex set; penalization; viscoelastic plate; thickness; obstacle; elliptic operators
Summary:
We deal with an optimal control problem governed by a pseudoparabolic variational inequality with controls in coefficients and in convex sets of admissible states. The existence theorem for an optimal control parameter will be proved. We apply the theory to the original design problem for a deffection of a viscoelastic plate with an obstacle, where the variable thickness of the plate appears as a control variable.
References:
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