The little Grothendieck theorem and Khintchine inequalities for symmetric spaces of measurable operators
Abstract
We prove the little Grothendieck theorem for any 2-convex noncommutative symmetric space. Let be a von Neumann algebra equipped with a normal faithful semifinite trace , and let E be an r.i. space on (0, \8). Let E() be the associated symmetric space of measurable operators. Then to any bounded linear map T from E() into a Hilbert space H corresponds a positive norm one functional f∈ E(2)()* such that ∀ x∈ E() \|T(x)\|2 K2 \|T\|2 f(x*x+xx*), where E(2) denotes the 2-concavification of E and K is a universal constant. As a consequence we obtain the noncommutative Khintchine inequalities for E() when E is either 2-concave or 2-convex and q-concave for some q<\8. We apply these results to the study of Schur multipliers from a 2-convex unitary ideal into a 2-concave one.
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