Superreflexivity and J-convexity of Banach spaces

Details Superreflexivity and J-convexity of Banach spaces Superreflexivity and J-convexity of Banach spaces

1997-10-15

arxiv.org/abs/math/9710204v1

Mathematics

Functional Analysis

Scientific paper

A Banach space X is superreflexive if each Banach space Y that is finitely representable in X is reflexive. Superreflexivity is known to be equivalent to J-convexity and to the non-existence of uniformly bounded factorizations of the summation operators S_n through X. We give a quantitative formulation of this equivalence. This can in particular be used to find a factorization of S_n through X, given a factorization of S_N through [L_2,X], where N is `large' compared to n.

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