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Contractive projections and operator spaces
Authors:Matthew Neal   Bernard Russo
Affiliation:Department of Mathematics, Denison University, Granville, Ohio 43023 ; Department of Mathematics, University of California, Irvine, California 92697-3875
Abstract:Parallel to the study of finite-dimensional Banach spaces, there is a growing interest in the corresponding local theory of operator spaces. We define a family of Hilbertian operator spaces $H_n^k$, $1le kle n$, generalizing the row and column Hilbert spaces $R_n$ and $C_n$, and we show that an atomic subspace $Xsubset B(H)$ that is the range of a contractive projection on $B(H)$is isometrically completely contractive to an $ell^infty$-sum of the $H_n^k$ and Cartan factors of types 1 to 4. In particular, for finite-dimensional $X$, this answers a question posed by Oikhberg and Rosenthal. Explicit in the proof is a classification up to complete isometry of atomic w$^*$-closed $JW^*$-triples without an infinite-dimensional rank 1 w$^*$-closed ideal.

Keywords:Contractive projection   operator space   complete contraction   Cartan factor   injective   mixed-injective   $JC^*$-triple   $JW^*$-triple   ternary algebra
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