English

Noncommutative Riesz transforms -- a probabilistic approach

Operator Algebras 2008-06-13 v2 Functional Analysis

Abstract

For 2p<2\le p<\infty we show the lower estimates A12xp\klc(p)max{\plΓ(x,x)1/2p,\plΓ(x,x)1/2p} \|A^{\frac 12}x\|_p \kl c(p)\max\{\pl \|\Gamma(x,x)^{{1/2}}\|_p,\pl \|\Gamma(x^*,x^*)^{{1/2}}\|_p\} for the Riesz transform associated to a semigroup (Tt)(T_t) of completely positive maps on a von Neumann algebra with negative generator Tt=etAT_t=e^{-tA}, and gradient form 2Γ(x,y)\lelAxy+xAyA(xy)\pl. 2\Gamma(x,y)\lel Ax^*y+x^*Ay-A(x^*y)\pl . As additional hypothesis we assume that Γ2\gl0\Gamma^2\gl 0 and the existence of a Markov dilation for (Tt)(T_t). 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.

Keywords

Cite

@article{arxiv.0801.1873,
  title  = {Noncommutative Riesz transforms -- a probabilistic approach},
  author = {Marius Junge and Tao Mei},
  journal= {arXiv preprint arXiv:0801.1873},
  year   = {2008}
}
R2 v1 2026-06-21T10:02:13.877Z