English

Conditional positive definiteness as a bridge between k-hyponormality and n-contractivity

Functional Analysis 2021-07-27 v2

Abstract

For sequences α{αn}n=0\alpha \equiv \{\alpha_n\}_{n=0}^{\infty} of positive real numbers, called weights, we study the weighted shift operators WαW_{\alpha} having the property of moment infinite divisibility (MID\mathcal{MID}); that is, for any p>0p > 0, the Schur power WαpW_{\alpha}^p is subnormal. We first prove that WαW_{\alpha} is MID\mathcal{MID} if and only if certain infinite matrices logMγ(0)\log M_{\gamma}(0) and logMγ(1)\log M_{\gamma}(1) are conditionally positive definite (CPD). Here γ\gamma is the sequence of moments associated with α\alpha, Mγ(0),Mγ(1)M_{\gamma}(0),M_{\gamma}(1) are the canonical Hankel matrices whose positive semi-definiteness determines the subnormality of WαW_{\alpha}, and log\log is calculated entry-wise (i.e., in the sense of Schur or Hadamard). Next, we use conditional positive definiteness to establish a new bridge between kk--hyponormality and nn--contractivity, which sheds significant new light on how the two well known staircases from hyponormality to subnormality interact. As a consequence, we prove that a contractive weighted shift WαW_{\alpha} is MID\mathcal{MID} if and only if for all p>0p>0, Mγp(0)M_{\gamma}^p(0) and Mγp(1)M_{\gamma}^p(1) are CPD.

Keywords

Cite

@article{arxiv.2012.10962,
  title  = {Conditional positive definiteness as a bridge between k-hyponormality and n-contractivity},
  author = {Chafiq Benhida and Raul E. Curto and George R. Exner},
  journal= {arXiv preprint arXiv:2012.10962},
  year   = {2021}
}
R2 v1 2026-06-23T21:06:36.133Z