In this paper, the notion of the bounded compact approximation property (BCAP) of a pair [Banach space and its subspace] is used to prove that if X is a closed subspace of Eoo with the BCAP, then L∞/X has the BCAP....In this paper, the notion of the bounded compact approximation property (BCAP) of a pair [Banach space and its subspace] is used to prove that if X is a closed subspace of Eoo with the BCAP, then L∞/X has the BCAP. We also show that X* has the A-BCAP with conjugate operators if and only if the pair (X, Y) has the A-BCAP for each finite codimensional subspace Y C X. Let M be a closed subspace of X such that M~ is complemented in X*. If X has the (bounded) approximation property of order p, then M has the (bounded) approximation property of order p.展开更多
基金supported by National Natural Science Foundation of China(Grant Nos.10526034 and 10701063)the Fundamental Research Funds for the Central Universities(Grant No.2011121039)supported by NSF(Grant Nos.DMS-0800061 and DMS-1068838)
文摘In this paper, the notion of the bounded compact approximation property (BCAP) of a pair [Banach space and its subspace] is used to prove that if X is a closed subspace of Eoo with the BCAP, then L∞/X has the BCAP. We also show that X* has the A-BCAP with conjugate operators if and only if the pair (X, Y) has the A-BCAP for each finite codimensional subspace Y C X. Let M be a closed subspace of X such that M~ is complemented in X*. If X has the (bounded) approximation property of order p, then M has the (bounded) approximation property of order p.
