English

Operator space valued Hankel matrices

Functional Analysis 2009-09-29 v1

Abstract

If EE is an operator space, the non-commutative vector valued LpL^p spaces Sp[E]S^p[E] have been defined by Pisier for any 1p1 \leq p \leq \infty. In this paper a necessary and sufficient condition for a Hankel matrix of the form (ai+j)0i,j(a_{i+j})_{0 \le i,j} with akEa_k \in E to be bounded in Sp[E]S^p[E] is established. This extends previous results of Peller where E=\CE=\C or E=SpE=S^p. The main theorem states that if 1p<1 \leq p < \infty, (ai+j)0i,j(a_{i+j})_{0 \le i,j} is bounded in Sp[E]S^p[E] if and only if there is an analytic function ϕ\phi in the vector valued Besov Space Bp1/p(E)B_p^{1/p}(E) such that an=ϕ^(n)a_n = \hat \phi(n) for all nNn \in \N. In particular this condition only depends on the Banach space structure of EE. We also show that the norm of the isomorphism ϕ(ϕ^(i+j))i,j\phi \mapsto (\hat \phi(i+j))_{i,j} grows as p\sqrt p as pp \to \infty, and compute the norm of the natural projection onto the space of Hankel matrices.

Keywords

Cite

@article{arxiv.0909.5151,
  title  = {Operator space valued Hankel matrices},
  author = {Mikael de la Salle},
  journal= {arXiv preprint arXiv:0909.5151},
  year   = {2009}
}

Comments

17 pages

R2 v1 2026-06-21T13:51:33.464Z