A class of multiobjective control problems

In this paper, a class of multiobjective control problems is considered, where the objective and constraint functions involved are f t x t ẋ t y t z t with x t ∈ R n , y t ∈ R n , and z t ∈ R m , where x t and z t are the control variables and y t is the state variable. Under the assumption of invex

defined another kind of invexity, corresponding generalized invexity, and discussed the duality for multiobjective control problems with such generalized invexity. In this paper, the duality results for multiobjective control problems with Mond and Smart's generalized invexity are discussed.

This paper presents a numerical solution of the multiobjective control system design problem for SISO systems. An approximation for the free transfer function in the Q-parametrization is proposed to obtain low-order controllers. The solution procedures are illustrated, some computational issues are

In this paper, both the Wolfe type and Mond᎐Weir type dual problems for a class of nondifferentiable multiobjective programs in which every component of the objective function contains a term involving the support function of a compact convex set are formulated. Weak duality theorems are established