Noncommutative Khintchine inequalities in interpolation spaces of Lp-spaces

Abstract

We prove noncommutative Khintchine inequalities for all interpolation spaces between Lp and L2 with p<2. In particular, it follows that Khintchine inequalities hold in L1,∞. Using a similar method, we find a new deterministic equivalent for the RC-norm in all interpolation spaces between Lp-spaces which unifies the cases p > 2 and p < 2. It produces a new proof of Khintchine inequalities for p<1 for free variables. To complete the picture, we exhibit counter-examples which show that neither of the usual closed formulas for Khintchine inequalities can work in L2,∞. We also give an application to martingale inequalities.