A Level-Depth Correspondence between Verlinde Rings and Subfactors
Abstract
We establish a correspondence between the levels of Verlinde rings and the depths of subfactors. Given the l-level Verlinde ring Rl(G) of a simple compact Lie group G, the tensor products of fundamental representations give us the inclusion of a pair of II1 factors N⊂ M. For the depth d of N⊂ M, we first prove d=l for type An,Cn and B2. More generally, the depth d is shown to satisfy β· l≤ d≤ l with β∈ (0,1), where β is uniquely determined by the simple type of G. We also show that the simple N-N-bimodules contained in L2(M) generate the Verlinde ring Rl(G) as its fusion category.
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