On subspaces of non-commutative Lp-spaces
Abstract
We study some structural aspects of the subspaces of the non-commutative (Haagerup) Lp-spaces associated with a general (non necessarily semi-finite) von Neumann algebra A. If a subspace X of Lp(A) contains uniformly the spaces pn, n>= 1, it contains an almost isometric, almost 1-complemented copy of p. If X contains uniformly the finite dimensional Schatten classes Spn, it contains their p-direct sum too. We obtain a version of the classical Kadec-Pel czynski dichotomy theorem for Lp-spaces, p>= 2. We also give operator space versions of these results. The proofs are based on previous structural results on the ultrapowers of Lp(A), together with a careful analysis of the elements of an ultrapower [Lp(A)]U which are disjoint from the subspace Lp(A). These techniques permit to recover a recent result of N. Randrianantoanina concerning a Subsequence Splitting Lemma for the general non-commutative Lp spaces. Various notions of p-equiintegrability are studied (one of which is equivalent to Randrianantoanina's one) and some results obtained by Haagerup, Rosenthal and Sukochev for Lp -spaces based on finite von Neumann algebras concerning subspaces of Lp(A) containing p are extended to the general case.
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