Stieltjes Differential Inclusions with Periodic Boundary Conditions without Upper Semicontinuity

Abstract: We are studying first order differential inclusions with periodic boundary conditions where the Stieltjes derivative with respect to a left-continuous non-decreasing function replaces the classical derivative. The involved set-valued mapping is not assumed to have compact and convex values, nor to be upper semicontinuous concerning the second argument everywhere, as in other related works. A condition involving the contingent derivative relative to the non-decreasing function (recently introduced and applied t… Show more

“…Below is the notion of contingent g-derivative, recently introduced in [27] (and applied e.g. in [20]).…”

Viability and Filippov-type Lemma for Stieltjes Differential Inclusions

“…Below is the notion of contingent g-derivative, recently introduced in [27] (and applied e.g. in [20]).…”

Viability and Filippov-type Lemma for Stieltjes Differential Inclusions

“…Such multivalued differential problems simply consist in replacing the usual derivatives by Stieltjes derivatives. Research on this subject can be found in [8][9][10][11][12] and the references therein.…”

Existence and Attractivity Results for Fractional Differential Inclusions via Nocompactness Measures

Existence and multiplicity of solutions of Stieltjes differential equations via topological methods