Invariant Subspaces for Generalized Differentiation and Volterra Operators

In this paper we provide a far-reaching generalization of the existent results about invariant subspaces of the differentiation operator $D=\frac{\partial}{\partial t}$ on $C^\infty(0,1)$ and the Volterra operator $Vf(t)=\int_0^tf(s)ds$, on $L^2(0,1)$. We use an abstract approach to study invariant subspaces of pairs $D,V$ with $DV=I$, where $V$ is compact and quasi-nilpotent and $D$ is unbounded densely defined and closed on the same Hilbert space. Our results cover many differential operators, like Schr\"odinger operators and a large class of other canonical systems, as well as the so-called compact self-adjoint operators with removable spectrum recently studied by Baranov and Yakubovich. Our methods are based on a model for such pairs which involves de Branges spaces of entire functions and plays a crucial role in the development. However, a number of difficulties arise from the fact that our abstract operators do not necessarily identify with the usual operators on such spaces, but with rank one perturbations of those, which, in terms of invariant subspaces creates a number of challenging problems.