On the power set of quasinilpotent operators

Abstract

For a quasinilpotent operator T on a separable Hilbert space H, Douglas and Yang define kx=λ→ 0\|(λ-T)-1x\|\|(λ-T)-1\| for each nonzero vector x, and call (T)=\kx:x 0\ the power set of T. In this paper, we prove that (T) is right closed, that is, σ∈(T) for each nonempty subset σ of (T). Moreover, for any right closed subset σ of [0,1] containing 1, we show that there exists a quasinilpotent operator T with (T)=σ. Finally, we prove that the power set of V, the Volterra operator on L2[0,1], is (0,1].