English

Free Monotone Transport

Operator Algebras 2013-10-09 v3 Probability

Abstract

By solving a free analog of the Monge-Amp\`ere equation, we prove a non-commutative analog of Brenier's monotone transport theorem: if an nn-tuple of self-adjoint non-commutative random variables Z1,...,ZnZ_{1},...,Z_{n} satisfies a regularity condition (its conjugate variables ξ1,...,ξn\xi_{1},...,\xi_{n} should be analytic in Z1,...,ZnZ_{1},...,Z_{n} and ξj\xi_{j} should be close to ZjZ_{j} in a certain analytic norm), then there exist invertible non-commutative functions FjF_{j} of an nn-tuple of semicircular variables S1,...,SnS_{1},...,S_{n}, so that Zj=Fj(S1,...,Sn)Z_{j}=F_{j}(S_{1},...,S_{n}). Moreover, FjF_{j} can be chosen to be monotone, in the sense that Fj=DjgF_{j}=\mathscr{D}_{j}g and gg is a non-commutative function with a positive definite Hessian. In particular, we can deduce that C(Z1,...,Zn)C(S1,...,Sn)C^{*}(Z_{1},...,Z_{n})\cong C^{*}(S_{1},...,S_{n}) and W(Z1,...,Zn)L(F(n))W^{*}(Z_{1},...,Z_{n})\cong L(\mathbb{F}(n)). Thus our condition is a useful way to recognize when an nn-tuple of operators generate a free group factor. We obtain as a consequence that the q-deformed free group factors Γq(Rn)\Gamma_{q}(\mathbb{R}^{n}) are isomorphic (for sufficiently small qq, with bound depending on nn) to free group factors. We also partially prove a conjecture of Voiculescu by showing that free Gibbs states which are small perturbations of a semicircle law generate free group factors. Lastly, we show that entrywise monotone transport maps for certain Gibbs measure on matrices are well-approximated by the matricial transport maps given by free monotone transport.

Keywords

Cite

@article{arxiv.1204.2182,
  title  = {Free Monotone Transport},
  author = {A. Guionnet and D. Shlyakhtenko},
  journal= {arXiv preprint arXiv:1204.2182},
  year   = {2013}
}

Comments

More corrections of typos as suggested by referees and a simplified proof of Lemma 3.4

R2 v1 2026-06-21T20:47:26.665Z