Article
MSC:
49A27,
49A29,
49A34,
49J40,
49J45,
49N70,
49N75,
49Q10,
49Q20,
73K10,
74K20,
74M05 | MR 1175928 | Zbl 0780.49027 | DOI: 10.21136/AM.1992.104514
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Keywords:
optimal control; variational inequality; convex set; laminated plate; thickness-function; rigid obstacle; optimal design in mechanics; elastic laminate plate
optimal control; variational inequality; convex set; laminated plate; thickness-function; rigid obstacle; optimal design in mechanics; elastic laminate plate
Summary:
The aim of the present paper is to study problems of optimal design in mechanics, whose variational form is given by inequalities expressing the principle of virtual power in its inequality form. The elliptic, linear symmetric operators as well as convex sets of possible states depend on the control parameter. The existence theorem for the optimal control is applied to design problems for an elastic laminated plate whose variable thickness appears as a control variable.
References:
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