Approximation properties and quantitative estimation for uniform ball-covering property of operator spaces

Abstract

In this paper, by dilation technique on Schauder frames, we extend Godefroy and Kalton's approximation theorem (1997), and obtain that a separable Banach space has the λ-unconditional bounded approximation property (λ-UBAP) if and only if, for any >0, it can be embeded into a (λ+)-complemented subspace of a Banach space with an 1-unconditional finite-dimensional decomposition (1-UFDD). As applications on ball-covering property (BCP) (Cheng, 2006) of operator spaces, also based on the relationship between the λ-UBAP and block unconditional Schauder frames, we prove that if X, Y are separable and (1) X or Y has the λ-reverse metric approximation property (λ-RMAP) for some λ>1; or (2) X or Y has an approximating sequence \Sn\n=1∞ such that n\|id-2Sn\| < 3/2, then the space of bounded linear operators B(X,Y) has the uniform ball-covering property (UBCP). Actually, we give uniformly quantitative estimation for the renormed spaces. We show that if X, Y are separable and X or Y has the (2-)-UBAP for any >0, then for all 1-/2 < α ≤ 1, the renormed space Zα=(B(X,Y),\|·\|α) has the (2α, 2α+-2-σ)-UBCP for all 0 <σ < 2α+-2. Furthermore, we point out the connections between the UBCP, u-ideals and the ball intersection property (BIP).