An application of free transport to mixed q-Gaussian algebras
Abstract
We consider the mixed q-Gaussian algebras introduced by Speicher which are generated by the variables Xi=li+li*,i=1,…,N, where li* lj-qijlj li*=δi,j and -1<qij=qji<1. Using the free monotone transport theorem of Guionnet and Shlyakhtenko, we show that the mixed q-Gaussian von Neumann algebras are isomorphic to the free group von Neumann algebra L(FN), provided that i,j|qij| is small enough. The proof relies on some estimates which are generalizations of Dabrowski's results for the special case qij q.
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