English

Spectral Picture For Rationally Multicyclic Subnormal Operators

Functional Analysis 2019-01-09 v1

Abstract

For a pure bounded rationally cyclic subnormal operator SS on a separable complex Hilbert space H,\mathcal H, J. B. Conway and N. Elias (Analytic bounded point evaluations for spaces of rational functions, J. Functional Analysis, 117:1{24, 1993) showed that clos(σ(S)σe(S))=clos(Int(σ(S))).clos(\sigma (S) \setminus \sigma_e (S)) = clos(Int (\sigma (S))). This paper examines the property for rationally multicyclic (N-cyclic) subnormal operators. We show: (1) There exists a 2-cyclic irreducible subnormal operator SS with clos(σ(S)σe(S))clos(Int(σ(S))).clos(\sigma (S) \setminus \sigma_e (S)) \neq clos(Int (\sigma (S))). (2) For a pure rationally NN-cyclic subnormal operator SS on H\mathcal H with the minimal normal extension MM on KH,\mathcal K \supset \mathcal H, let Km=clos(span{(M)kx: xH, 0km}.\mathcal K_m = clos (span\{(M^*)^kx: ~x\in\mathcal H,~0\le k \le m\}. Suppose MKN1M |_{\mathcal K_{N-1}} is pure, then clos(σ(S)σe(S))=clos(Int(σ(S))).clos(\sigma (S) \setminus \sigma_e (S)) = clos(Int (\sigma (S))).

Keywords

Cite

@article{arxiv.1803.05736,
  title  = {Spectral Picture For Rationally Multicyclic Subnormal Operators},
  author = {Liming Yang},
  journal= {arXiv preprint arXiv:1803.05736},
  year   = {2019}
}

Comments

17 pages. arXiv admin note: text overlap with arXiv:1710.11265

R2 v1 2026-06-23T00:54:11.342Z