A remark on a lemma from Filippov’s article on differential inclusions

The Filippov’s article discusses a possible definition of the solution of differential equation with discontinuous right-hand side. The lemma on the structure of the set defining differential
inclusion given by Filippov implies an equivalent solution definition, which allows us to expand possible domains and codomains of the function, that is in the right-hand side of the equation. In this paper we find a generalization of this lemma to the case of general topologic and measure spaces. Proofs of corresponding theorems are given here.

1. A. F. Filippov, 1960, Differential equations with discontinuous right-hand side, Math. col., T.

2. (93), № 1, pp. 99-128.

3. A. F. Filippov, 1985, Differential equations with discontinuous right-hand side. - M.: Science.

4. Main editorial office of physical and mathematical literature.

5. Stewart, D.E, 2000, Formulating Measure Differential Inclusions in Infinite Dimensions. Set-

6. Valued Analysis 8, pp. 273-293.

7. A. A. Tolstonogov, 1981, Differential inclusions in a Banach space with nonconvex right-hand

8. side. Existence of solutions, Sib. Math. Journal, T. 22, № 4, pp. 182-198.

9. P. S. Alexandrov, 1977, Introduction to set theory and general topology, Main edition of physical

10. and mathematical literature of the publishing house “Nauka”, М.,368 p.

11. K. Kuratovskiy, 1966, Topology, T. 1, Moscow, "Mir 1966.

12. A. Robertson, V. Robertson, 1967, Topological vector spaces. Moscow, “Mir”.