A note on necessary optimality conditions for a class of generalized fractional programming;

In this paper, the necessary optimality conditions for vector extremum problems with equality constraint in product of Banach spaces are obtained by using a implicit function theorem in Banach spaces and a theorem of the alternative for subconvexlike vector-valued maps in ordered linear topological spaces.

In this paper,by using a implicit function theorem in Banach spaces the necessary optimality conditions for mathematical programming problems with equality constraints in the product of Banach spaces are established.

The Kuhn-Tucker type necessary optimality conditions under this constraint qualification are derived.

Moreover,the necessary optimality conditions in mathematical programming problem with equality and inequality constraints of Lipschitz functions are derived with the help of Ekeland variational principle on Riemannian manifolds.

By transformalating the multi-objective fractional programming into an equivalent multi-objective programming,the necessary and sufficient optimality conditions of Fritz John and Kuhn Tucker type are obtained.

With it, it gets the necessary optimality conditions for a kind of generalized and composite optimization problem.