Free monotone transport for infinite variables

Abstract

We extend the free monotone transport theorem of Guionnet and Shlyakhtenko to the case of infinite variables. As a first application, we provide a criterion for when mixed q-Gaussian algebras are isomorphic to L(F∞); namely, when the structure array Q of a mixed q-Gaussian algebra has uniformly small entries that decay sufficiently rapidly. Here a mixed q-Gaussian algebra with structure array Q=(qij)i,j∈N is the von Neumann algebra generated by XnQ=ln+ln*, n∈N and (ln) are the Fock space representations of the commutation relation li*lj-qijljli*=δi=j, i,j∈N, -1<qij=qji<1.