Viability and generalized differential quotients

Necessary and sufficient conditions for a set-valued map K : R ։ R to be GDQ-differentiable are given. It is shown that K is GDQ differentiable at t0 if and only if it has a local multiselection that is Cellina continuously approximable and Lipschitz at t0. It is also shown that any minimal GDQ of K at (t0, y0) is a subset of the contingent derivative of K at (t0, y0), evaluated at 1. Then this fact is used to prove a viability theorem that asserts existence of a solution to the initial value problem ẏ(t) ∈ F (t, y(t)), with y(t0) = y0, where F : Gr(K) ։ R n is an orientor field (i.e. multivalued vector field) defined only on the graph of K and K : T ։ R is a time-varying constraint multifunction. One of the assumptions is GDQ differentiability of K.