Centralizers of discrete Temperley-Lieb-Jones subfactors

Abstract

Discrete, unimodular inclusions of factors (N⊂eq M, E) with N of type II1 have a natural notion of standard invariant, generalizing the finite index case. When the unitary tensor category of N-N bimodules generated by NL2(M, τ E)N is equivalent to the Temperley-Lieb-Jones category TLJ(δ), the associated discrete standard invariants are classified in terms of fair and balanced δ-graphs. Many examples of these subfactors naturally arise in the context of the Guionnet-Jones-Shlyakhtenko (GJS) construction for graphs. In this paper, we compute the discrete standard invariant of the centralizer subfactor N⊂eq Mφ for the canonical state φ=τ E, which is again a discrete subfactor of TLJ(δ)-type. We show that the associated fair and balanced δ-graph behaves analogously to a universal covering space of the original fair and balanced δ-graph. As an application, we obtain an obstruction to the realization of discrete tracial TLJ-type standard invariants by subfactors of a II1 factor M in terms of the fundamental group of M.

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