Continuums of solutions for integral inclusions on the half line (Q2731140)

The authors discuss the properties of the set of solutions to an abstract Volterra inclusion (I) \(y(t)\in (Vy)(t)\), \(t\in [0,\infty)\), in the spaces \(C(0,\infty)\) and \(L^p(0,\infty)\). Upon suitable conditions, depending on the underlying space, it is shown that the set of solutions of (I) is nonempty (which means that solutions do exist), compact and connected. They rely on a result due to \textit{V. Šeda} and \textit{Z. Kubácek} [Czech. Math. J., 42, No. 4, 577-588 (1992; Zbl 0793.47055)], which can be formulated in terms of metric spaces. Applications are provided for integral inclusions of the form NEWLINE\[NEWLINEy(t)\in h(t)+ \int^t_0 k(t,s)F\bigl(s,y(s) \bigr)ds.NEWLINE\]