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 to initial value problems by R.L. Pouso, I.M. Marquez Albes, and J. Rodriguez-Lopez) is imposed on the set where the upper semicontinuity and the assumption to have compact convex values fail. Based on previously obtained results for ...
AbstractIn this paper, we study the periodic problem for semi-linear evolution inclusion. Using tech...
A bound sets technique is developed for Floquet problems to Carath\ue8odory differential inclusions....
AbstractIn this paper we investigate the existence of solutions for first and second order nonresona...
We are studying first order differential inclusions with periodic boundary conditions where the St...
summary:Using a Nagumo type tangential condition and a recent theorem on the existence of directiona...
The existence of viable solutions is proven for nonautonomous upper semicontinuous differential incl...
summary:We consider first order periodic differential inclusions in $\mathbb {R}^N$. The presence of...
summary:Sufficient conditions on the existence of periodic solutions for semilinear differential inc...
ABSTRACT. In the paper we study the continuity properties of the solution set of upper semicontinuou...
summary:In this paper we consider periodic and Dirichlet problems for second order vector differenti...
AbstractIn this paper we study the existence of periodic solutions for differential inclusions. We p...
In this paper, the existence and the localization of a solution of an impulsive vector multivalued s...
In this paper we prove the existence of mild solutions for a first-order impulsive semilinear stocha...
Stieltjes differential equations, which contain equations with impulses and equations on time scales...
The aim of this paper is to provide a Filippov-Wa\.{z}ewski Relaxation Theorem for the very general...
AbstractIn this paper, we study the periodic problem for semi-linear evolution inclusion. Using tech...
A bound sets technique is developed for Floquet problems to Carath\ue8odory differential inclusions....
AbstractIn this paper we investigate the existence of solutions for first and second order nonresona...
We are studying first order differential inclusions with periodic boundary conditions where the St...
summary:Using a Nagumo type tangential condition and a recent theorem on the existence of directiona...
The existence of viable solutions is proven for nonautonomous upper semicontinuous differential incl...
summary:We consider first order periodic differential inclusions in $\mathbb {R}^N$. The presence of...
summary:Sufficient conditions on the existence of periodic solutions for semilinear differential inc...
ABSTRACT. In the paper we study the continuity properties of the solution set of upper semicontinuou...
summary:In this paper we consider periodic and Dirichlet problems for second order vector differenti...
AbstractIn this paper we study the existence of periodic solutions for differential inclusions. We p...
In this paper, the existence and the localization of a solution of an impulsive vector multivalued s...
In this paper we prove the existence of mild solutions for a first-order impulsive semilinear stocha...
Stieltjes differential equations, which contain equations with impulses and equations on time scales...
The aim of this paper is to provide a Filippov-Wa\.{z}ewski Relaxation Theorem for the very general...
AbstractIn this paper, we study the periodic problem for semi-linear evolution inclusion. Using tech...
A bound sets technique is developed for Floquet problems to Carath\ue8odory differential inclusions....
AbstractIn this paper we investigate the existence of solutions for first and second order nonresona...