Some relations between ε-directional derivative and ε-generalized weak subdifferential

In this paper, we study ε-generalized weak subdifferential for vector valued functions defined on a real ordered topological vector space X. We give various characterizations of ε-generalized weak subdifferential for this class of functions. It is well known that if the function f : X → R is subdifferentiable at x۰ ∈ X, then f has a global minimizer at x۰ if and only if ۰ ∈ ∂ f(x۰). We show that a similar result can be obtained for ε-generalized weak subdifferential. Finally, we investigate some relations between ε-directional derivative and ε-generalized weak subdifferential. In fact, in the classical subdifferential theory, it is well known that if the function f : X → R is subdifferentiable at x۰ ∈ X and it has directional derivative at x۰ in the direction u ∈ X, then the relation f ′(x۰, u) ≥ ⟨u, x∗⟩, ∀ x∗ ∈ ∂ f(x۰) is satisfied. We prove that a similar result can be obtained for ε- generalized weak subdifferential.