A semi-finite algebra associated to a planar algebra

Abstract

We canonically associate to any planar algebra two type II∞ factors M+ and M-. The subfactors constructed previously by the authors in a previous paper are isomorphic to compressions of M+ and M- to finite projections. We show that each M is isomorphic to an amalgamated free product of type I von Neumann algebras with amalgamation over a fixed discrete type I von Neumann subalgebra. In the finite-depth case, existing results in the literature imply that M+ M- is the amplification a free group factor on a finite number of generators. As an application, we show that the factors Mj constructed in our previous paper are isomorphic to interpolated free group factors L(F(rj)), rj=1+2δ-2j(δ-1)I, where δ2 is the index of the planar algebra and I is its global index. Other applications include computations of laws of Jones-Wenzl projections.