Integrated solutions of non-densely defined semilinear integro-differential inclusions: existence, topology and applications

Given a linear closed but not necessarily densely defined operator $A$ on a Banach space $E$ with nonempty resolvent set and a multivalued map $F\colon I\times E\multimap E$ with weakly sequentially closed graph, we consider the integro-differential inclusion
$$ \dot{u}\in Au+F\biggl(t,\int u\biggr)\quad\text{on } I,\qquad u(0)=x_0. $$
We focus on the case when $A$ generates an integrated semigroup and obtain existence of integrated solutions if $E$ is weakly compactly generated and $F$ satisfies
$$ \beta(F(t,\Omega))\leqslant \eta(t)\beta(\Omega) \quad\text{for all bounded } \Omega\subset E, $$
where $\eta\in L^1(I)$ and $\beta$ denotes the De Blasi measure of noncompactness. When $E$ is separable, we are able to show that the set of all integrated solutions is a compact $R_\delta$-subset of the space $C(I,E)$ endowed with the weak topology. We use this result to investigate a nonlocal Cauchy problem described by means of a nonconvex-valued boundary condition operator. We also include some applications to partial differential equations with multivalued terms are.
Bibliography: 26 titles.