Noncommutative vector valued $L_p$-spaces and completely $p$-summing maps

Details Noncommutative vector valued $L_p$-spaces and completely $p$-summing maps Noncommutative vector valued $L_p$-spaces and completely $p$-summing maps

1993-06-07

arxiv.org/abs/math/9306206v1

Ast\'erisque (Soc. Math. France) 247 (1998) 1-131.

Mathematics

Functional Analysis

Scientific paper

Let $E$ be an operator space in the sense of the theory recently developed by Blecher-Paulsen and Effros-Ruan. We introduce a notion of $E$-valued non commutative $L_p$-space for $1 \leq p < \infty$ and we prove that the resulting operator space satisfies the natural properties to be expected with respect to e.g. duality and interpolation. This notion leads to the definition of a ``completely p-summing" map which is the operator space analogue of the $p$-absolutely summing maps in the sense of Pietsch-Kwapie\'n. These notions extend the particular case $p=1$ which was previously studied by Effros-Ruan.

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