Evolution semigroups for nonautonomous Cauchy problems (Q1809790)

Summary: We characterize wellposedness of nonautonomous, linear Cauchy problems \[ \begin{cases} \dot u(t)= A(t)u(t)\\ u(s)= x\in X\end{cases}\tag{NCP} \] on a Banach space \(X\) by the existence of certain evolution semigroups. Then, we use these generation results for evolution semigroups to derive wellposedness for nonautonomous Cauchy problems under some ``concrete'' conditions. As a typical example, we discuss the so-called ``parabolic'' case.