Existence of solutions of optimization problems and porosity

We define the generalized efficient solution which is more general than the weakly efficient solution for vector optimization problems, and prove the existence of the generalized efficient solution for nondifferentiable vector optimization problems by using vector variational-like inequalities for s

In the present study we have formulated a generalization of entropy optimization problems (GEOP), proposed sufficient conditions for the existence of solution. We have suggested also a new method based on a priori evaluations and Newton's methods for calculation of Langrange multipliers. Mentioned m

In this paper, we consider a two-level optimization problem with nonunique lower-level solutions. We give sufficient conditions ensuring the existence of solutions.

By applying the properties of the unique classical solution to the singular boundary value problem on half line -p (s) = g(p(s)); p(s) ¿ 0; s ∈ (0; ∞); p(0) = 0; lims→∞p (s) = b ¿ 0, and constructing the new comparison functions, they show the existence and the optimal global estimates of solutions