Completely seminormal operators with boundary eigenvalues

Abstract:

For $f \in {L^2}(E)$ we consider the singular integral operator ${T_E}f(s) = sf(s) + {\pi ^{ - 1}}{\smallint _E}f(t){(t - s)^{ - 1}}dt$. These singular integral operators are a special case of operators acting on a Hilbert space with one dimensional self-commutator. We discover generalized eigenfunctions of the equation ${T_E}f = 0$ and, for $p < 2$, we will give an ${L^p}(E)$ solution of the equation ${T_E}f = {\chi _E}$. The main result of the paper is an example of a nonzero ${L^2}(E)$ solution of ${T_E}f = 0$, with $\lambda = 0$ a boundary point of the spectrum of ${T_E}$.