On second-order differential inclusions in Banach spaces (Q2746293)

Here, the author investigates the existence of mild solutions on an unbounded real interval to second-order initial value problems for a class of differential inclusions in Banach spaces of the form \(y''-Ay \in F(t,y)\), \(y(0)=y_0\), \(y'(0)=y_1\). The main result states the existence of a mild solution when assuming that \(A\) is an infinitesimal semigroup generator, that \(F\) is strongly measurable with respect to \(t\) which admits a measurable selection for any continuous map \(y(\cdot)\) and which has a linear growth with respect to \(y\) and that a compactness property of the set of integral solutions associated with the initial value problem holds true.