On the best constants in noncommutative Khintchine-type inequalities

Abstract

We obtain new proofs with improved constants of the Khintchine-type inequality with matrix coefficients in two cases. The first case is the Pisier and Lust-Piquard noncommutative Khintchine inequality for p=1, where we obtain the sharp lower bound of 12 in the complex Gaussian case and for the sequence of functions \ei2nt\n=1∞ . The second case is Junge's recent Khintchine-type inequality for subspaces of the operator space R C, which he used to construct a cb-embedding of the operator Hilbert space OH into the predual of a hyperfinite factor. Also in this case, we obtain a sharp lower bound of 12 . As a consequence, it follows that any subspace of a quotient of (R C)* is cb-isomorphic to a subspace of the predual of the hyperfinite factor of type III1, with cb-isomorphism constant ≤ 2 . In particular, the operator Hilbert space OH has this property.

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