Luzin theorem and right-hand sides of differential inclusions (Q1073229)

Let K denote a compact topological space, \(I=<a,b>\) a bounded interval and L be a finite dimensional Euclidean space. Consider the class \(\Phi_ m\) of all multivalued mappings \(F: I\times K\to L\), satisfying the conditions: (1) for each (t,y)\(\in I\times K\) the set F(t,y) is nonempty, convex and compact, (2) for a fixed \(t\in I\) the mapping \(y\to F(t,y)\) is upper semicontinuous, (3) for each set \(U\subset K\) being open in K and for each open and convex subset V of L the set \(M^*(U,V)=\{t:\) \(t\in I\), F(\(\{\) \(t\}\) \(\times U)\subset V\}\) is measurable. Then the following generalization of the Luzin theorem is given: \(F\in \Phi_ m\) iff for any \(\epsilon >0\) there exists a closed subset H of I with measure greater than b-a-\(\epsilon\) and such that F is upper semicontinuous on H. Other results in a similar fashion are also formulated.