D-Invexity and optimality conditions

Under different forms of invexity conditions, sufficient Kuhn᎐Tucker conditions and three dual models are presented for the minimax fractional programming.

In this paper the various definitions of nonsmooth invex functions are gathered in a general scheme by means of the concept of K-directional derivative. Characterizations of nonsmooth K-invexity are derived as well as results concerning constrained optimization without any assumption of convexity of

We extend the concepts of B-type I and generalized B-type I functions to the continuous case and we use these concepts to establish sufficient optimality conditions and duality results for multiobjective variational programming problems.

For a constrained minimization problem in infinite dimensions, in particular an optimal control problem, the attainment of a minimum follows if necessary Lagrangian conditions---Karnsh-Kuhn-Tucker or equivalently Pontryagin--are solvable, provided that a suitable invex hypothesis holds. Duality resu