We investigate the regularity of semipermeable surfaces along barrier solutions without the assumption of smoothness of the right-hand side of the differential inclusion. We check what can be said if the assumptions concern not the right-hand side itself but the cones it generates. We examine also the properties of families of sets with semipermeable boundaries.

In this paper, we study the existence of integrable solutions for the set-valued differential equation of fractional type $(D^{\alpha ₙ}-{\sum }_{i=1}^{n-1}{a}_i{D}^{{\alpha }_i})x\left(t\right)\in F(t,x\left(\phi \left(t\right)\right))$, a.e. on (0,1), $I^{1-\alpha ₙ}x\left(0\right)=c$, αₙ ∈ (0,1), where F(t,·) is lower semicontinuous from ℝ into ℝ and F(·,·) is measurable. The corresponding single-valued problem will be considered first.

We consider the problem of the existence of solutions of the random set-valued equation: (I) $D_H{X}_t=F(t,X_t)P.1$, t ∈ [0,T] -a.e.; X₀ = U p.1 where F and U are given random set-valued mappings with values in the space $K_c\left(E\right)$, of all nonempty, compact and convex subsets of the separable Banach space E. Under certain restrictions on F we obtain existence of solutions of the problem (I). The connections between solutions of (I) and solutions of random differential inclusions are investigated.

We present the concepts of set-valued stochastic integrals in a plane and prove the existence of a solution to stochastic integral inclusions of the form $z_{s,t}\in {\phi }_{s,t}+{\int }_0^s{\int }_0^t{F}_{u,v}\left(z_{u,v}\right)dudv+{\int }_0^s{\int }_0^t{G}_{u,v}\left(z_{u,v}\right)d{w}_{u,v}$

For a system of linear ordinary differential equations with constant coefficients a simple proof is given that hyperbolicity is equivalent to shadowing.

Let $ℱ:L\to TS$ be a foliation on a complex, smooth and irreducible projective surface $S$, assume $ℱ$ admits a holomorphic first integral $f:S\to {\mathbb{P}}^1$. If $h^0(S,{𝒪}_S(-n{𝒦}_S\left)\right)\>0$ for some $n\ge 1$ we prove the inequality: $(2n-1)(g-1)\le h^1(S,{ℒ}^{\text{'}-1}(-(n-1)K_S\left)\right)+h^0(S,{ℒ}^{\text{'}})+1$. If $S$ is rational we prove that the direct image sheaves of the co-normal sheaf of $ℱ$ under $f$ are locally free; and give some information on the nature of their decomposition as direct sum of invertible sheaves.

A new class of singular fractional linear systems and electrical circuits is introduced. Using the Caputo definition of the fractional derivative, the Weierstrass regular pencil decomposition and the Laplace transformation, the solution to the state equation of singular fractional linear systems is derived. It is shown that every electrical circuit is a singular fractional system if it contains at least one mesh consisting of branches only with an ideal supercapacitor and voltage sources or at least...

We study a system of two differential inclusions such that there is a singular perturbation in the second one. We state new convergence results of solutions under assumptions concerning contingent derivative of the perturbed inclusion. These results state that there exists at least one family of solutions which converges to some solution of the reduced system. We extend this result to perturbed systems with state constraints.