An Optimal Shape Design Problem for Plates

Abstract: We consider an optimal shape design problem for the plate equation, where the variable thickness of the plate is the design function. This problem can be formulated as a control in the coefficient PDE-constrained optimal control problem with additional control and state constraints. The state constraints are treated with a Moreau-Yosida regularization of a dual problem. Variational discretization is employed for discrete approximation of the optimal control problem. For discretization of the state in the mixed… Show more

“…For the discretization piecewise affine, continuous finite elements are taken into account. Recently, an optimal control problem for plates with variable thickness was studied by Deckelnick et al [7]. Also here, the thickness of the plate is the design function.…”

Material optimization for nonlinearly elastic planar beams

“…For the discretization piecewise affine, continuous finite elements are taken into account. Recently, an optimal control problem for plates with variable thickness was studied by Deckelnick et al [7]. Also here, the thickness of the plate is the design function.…”

Material optimization for nonlinearly elastic planar beams

On material optimisation for nonlinearly elastic plates and shells