Free transport for finite depth subfactor planar algebras

Abstract

Given a finite depth subfactor planar algebra P endowed with the graded *-algebra structures \Grk+ P\k∈N of Guionnet, Jones, and Shlyakhtenko, there is a sequence of canonical traces Trk,+ on Grk+P induced by the Temperley-Lieb diagrams and a sequence of trace-preserving embeddings into the bounded operators on a Hilbert space. Via these embeddings the *-algebras \Grk+P\k∈ N generate a tower of non-commutative probability spaces \Mk,+\k∈N whose inclusions recover P as its standard invariant. We show that traces Trk,+(v) induced by certain small perturbations of the Temperley-Lieb diagrams yield trace-preserving embeddings of Grk+P that generate the same tower \Mk,+\k∈N.