English

Operator ideals on non-commutative function spaces

Operator Algebras 2013-09-24 v1

Abstract

Suppose XX and YY are Banach spaces, and I{\mathcal{I}}, J{\mathcal{J}} are operator ideals (for instance, the ideals of strictly singular, weakly compact, or compact operators). Under what conditions does the inclusion I(X,Y)J(X,Y){\mathcal{I}}(X,Y) \subset {\mathcal{J}}(X,Y), or the equality I(X,Y)=J(X,Y){\mathcal{I}}(X,Y) = {\mathcal{J}}(X,Y), hold? We examine this question when I,J{\mathcal{I}}, {\mathcal{J}} are the ideals of Dunford-Pettis, strictly (co)singular, finitely strictly singular, inessential, or (weakly) compact operators, while XX and YY are non-commutative function spaces. Since such spaces are ordered, we also address the same questions for positive parts of such ideals.

Keywords

Cite

@article{arxiv.1309.5434,
  title  = {Operator ideals on non-commutative function spaces},
  author = {T. Oikhberg and E. Spinu},
  journal= {arXiv preprint arXiv:1309.5434},
  year   = {2013}
}
R2 v1 2026-06-22T01:31:24.408Z