A noncommutative martingale convexity inequality

Abstract

Let M be a von Neumann algebra equipped with a faithful semifinite normal weight φ and N be a von Neumann subalgebra of M such that the restriction of φ to N is semifinite and such that N is invariant by the modular group of φ. Let E be the weight preserving conditional expectation from M onto N. We prove the following inequality: \[\|x\|p2 \|E(x)\|p2+(p-1)\|x-E(x)\|p2, x∈ Lp(M),1<p2,\] which extends the celebrated Ball-Carlen-Lieb convexity inequality. As an application we show that there exists 0>0 such that for any free group Fn and any q4-0, \[\|Pt\|2 q1 tq-1,\] where (Pt) is the Poisson semigroup defined by the natural length function of Fn.