화학공학소재연구정보센터
Applied Mathematics and Optimization, Vol.51, No.2, 183-200, 2005
Maximum principle in the optimal design of plates with stratified thickness
An optimal design problem for a plate governed by a linear, elliptic equation with bounded thickness varying only in a single prescribed direction and with unilateral isoperimetrical-type constraints is considered. Using Murat-Tartar's homogenization theory for stratified plates and Young-measure relaxation theory, smoothness of the extended cost and constraint functionals is proved, and then the maximum principle necessary for an optimal relaxed design is derived.