English

A non-hyponormal operator generating Stieltjes moment sequences

Functional Analysis 2012-03-19 v1

Abstract

A linear operator SS in a complex Hilbert space \hh\hh for which the set \dznS\dzn{S} of its CC^\infty-vectors is dense in \hh\hh and {Snf2}n=0\{\|S^n f\|^2\}_{n=0}^\infty is a Stieltjes moment sequence for every f\dznSf \in \dzn{S} is said to generate Stieltjes moment sequences. It is shown that there exists a closed non-hyponormal operator SS which generates Stieltjes moment sequences. What is more, \dznS\dzn{S} is a core of any power SnS^n of SS. This is established with the help of a weighted shift on a directed tree with one branching vertex. The main tool in the construction comes from the theory of indeterminate Stieltjes moment sequences. As a consequence, it is shown that there exists a non-hyponormal composition operator in an L2L^2-space (over a σ\sigma-finite measure space) which is injective, paranormal and which generates Stieltjes moment sequences. In contrast to the case of abstract Hilbert space operators, composition operators which are formally normal and which generate Stieltjes moment sequences are always subnormal (in fact normal). The independence assertion of Barry Simon's theorem which parameterizes von Neumann extensions of a closed real symmetric operator with deficiency indices (1,1)(1,1) is shown to be false.

Keywords

Cite

@article{arxiv.1110.0249,
  title  = {A non-hyponormal operator generating Stieltjes moment sequences},
  author = {Z. J. Jablonski and I. B. Jung and J. Stochel},
  journal= {arXiv preprint arXiv:1110.0249},
  year   = {2012}
}
R2 v1 2026-06-21T19:13:58.945Z