On generalized solutions of differential equations with several operator coefficients (Q1933304)

Let \(\{A_i(t)\}_{i=1}^m\) be a collection of uniformly bounded operators on \(t\in I=(-l,l)\) (\(l\leq+\infty\)) acting in a separable Hilbert space \(H\). Let \(W_{2,0}^p(H,I)\) be the Sobolev space of \(H\)-valued vector functions vanishing at \(t=0\). For the differential expression \[ \mathcal{L}^+u(t):=\sum_{k=1}^m(-1)^k(A^\ast(t)u(t))^{(k)} \] (formally adjoint to the differential expression \(\mathcal{L}u(t)=\sum_{k=1}^mA(t)u^{(k)}(t)\)), the existence of a fundamental solution is proved such that every generalized solutions \(\phi(t)\in W_{2,0}^{-l}(H,I)\) (\(l=1,2,\dots\)) of the equation \(\mathcal{L}^+u=0\) is smooth, i.e., \(\phi(t)\in W^p(H,I)\) for any \(p=1,2,\dots\).