Noncommutative Riesz transforms -- a probabilistic approach

Abstract

For 2 p<∞ we show the lower estimates \[ \|A 12x\|p c(p)\ \|(x,x)1/2\|p, \|(x*,x*)1/2\|p\ \] for the Riesz transform associated to a semigroup (Tt) of completely positive maps on a von Neumann algebra with negative generator Tt=e-tA, and gradient form \[ 2(x,y) Ax*y+x*Ay-A(x*y) .\] As additional hypothesis we assume that 2 0 and the existence of a Markov dilation for (Tt). We give applications to quantum metric spaces and show the equivalence of semigroup Hardy norms and martingale Hardy norms derived from the Markov dilation. In the limiting case we obtain a viable definition of BMO spaces for general semigroups of completely positive maps which can be used as an endpoint for interpolation. For torsion free ordered groups we construct a connection between Riesz transforms and the Hilbert transform induced by the order.