Spectral Picture For Rationally Multicyclic Subnormal Operators

Abstract

For a pure bounded rationally cyclic subnormal operator S on a separable complex Hilbert space H, J. B. Conway and N. Elias (Analytic bounded point evaluations for spaces of rational functions, J. Functional Analysis, 117:124, 1993) showed that clos(σ (S) σe (S)) = clos(Int (σ (S))). This paper examines the property for rationally multicyclic (N-cyclic) subnormal operators. We show: (1) There exists a 2-cyclic irreducible subnormal operator S with clos(σ (S) σe (S)) ≠ clos(Int (σ (S))). (2) For a pure rationally N-cyclic subnormal operator S on H with the minimal normal extension M on K ⊃ H, let Km = clos (span\(M*)kx: ~x∈ H,~0 k m\. Suppose M | KN-1 is pure, then clos(σ (S) σe (S)) = clos(Int (σ (S))).