Completely 1-complemented subspaces of Schatten spaces

Abstract

We consider the Schatten spaces Sp in the framework of operator space theory and for any 1≤ p=2<∞, we characterize the completely 1-complemented subspaces of Sp. They turn out to be the direct sums of spaces of the form Sp(H,K), where H,K are Hilbert spaces. This result is related to some previous work of Arazy-Friedman giving a description of all 1-complemented subspaces of Sp in terms of the Cartan factors of types 1-4. We use operator space structures on these Cartan factors regarded as subspaces of appropriate noncommutative Lp-spaces. Also we show that for any n≥ 2, there is a triple isomorphism on some Cartan factor of type 4 and of dimension 2n which is not completely isometric, and we investigate Lp-versions of such isomorphisms.