Well-posedness of the Cauchy problem for an inclusion (Q2388050)

The author considers the Cauchy problem for the inclusion \[ u'(t)\in {\mathcal A}u(t), \,\,\, t\in [0,t), \,\, t\leq \infty, \quad u(0)=x, \] with a linear multi-valued operator \({\mathcal A}\) in a Banach space \(X.\) He obtains a criterion for well-posedness on the set \(D({\mathcal A}^{n+1})\) in terms of the degenerate semigroup with generator \({\mathcal A}\) and the \(C_0\)-semigroup generated by a single-valued restriction of \({\mathcal A}\) and also in terms of estimates for the pseudoresolvent of \({\mathcal A}.\) An example in which well-posedness fails on the set \(D({\mathcal A})\) but the problem is well posed on \(D({\mathcal A}^2)\) is presented.