中文

M-Complete approximate identities in operator spaces

算子代数 2007-05-23 v1 泛函分析

摘要

This work introduces the concept of an M-complete approximate identity (M-cai) for a given operator subspace X of an operator space Y. M-cai's generalize central approximate identities in ideals in CC^*-algebras, for it is proved that if X admits an M-cai in Y, then X is a complete M-ideal in Y. It is proved, using ``special'' M-cai's, that if J\cal J is a nuclear ideal in a CC^*-algebra A\cal A, then J\cal J is completely complemented in Y for any (isomorphically) locally reflexive operator space Y with JYA\cal J \subset Y \subset \cal A and Y/JY/\cal J separable. (This generalizes the previously known special case where Y=AY=\cal A, due to Effros-Haagerup.) In turn, this yields a new proof of the Oikhberg-Rosenthal Theorem that K\cal K is completely complemented in any separable locally reflexive operator superspace, K\cal K the CC^*-algebra of compact operators on 2\ell^2. M-cai's are also used in obtaining some special affirmative answers to the open problem of whether K\cal K is Banach-complemented in A\cal A for any separable CC^*-algebra A\cal A with KAB(2)\cal K\subset\cal A\subset B(\ell^2). It is shown that if conversely X is a complete M-ideal in Y, then X admits an M-cai in Y in the following situations: (i) Y has the (Banach) bounded approximation property; (ii) Y is 1-locally reflexive and X is λ\lambda-nuclear for some λ1\lambda \ge1; (iii) X is a closed 2-sided ideal in an operator algebra Y (via the Effros-Ruan result that then X has a contractive algebraic approximate identity). However it is shown that there exists a separable Banach space X which is an M-ideal in Y=XY=X^{**}, yet X admits no M-approximate identity in Y.

引用

@article{arxiv.math/9911110,
  title  = {M-Complete approximate identities in operator spaces},
  author = {A. Arias and Haskell P. Rosenthal},
  journal= {arXiv preprint arXiv:math/9911110},
  year   = {2007}
}

备注

55 pages, AMSTeX, inc. eps figures