W*-representations of subfactors and restrictions on the Jones index
Abstract
A W*-representation of a II1 subfactor N⊂ M with finite Jones index, [M:N]<∞, is a non-degenerate commuting square embedding of N⊂ M into an inclusion of atomic von Neumann algebras i∈ I B( Ki)= N ⊂ E M=j∈ J B( Hj). We undertake here a systematic study of this notion, first introduced in [P92], giving examples and considering invariants such as the (bipartite) inclusion graph N ⊂ M, the coupling vector ( dim(M Hj))j and the RC-algebra (relative commutant) M' N, for which we establish some basic properties. We then prove that if N⊂ M admits a W*-representation N⊂ E M, with the expectation E preserving a semifinite trace on M, such that there exists a norm one projection of M onto M commuting with E, a property of N⊂ M that we call weak injectivity/amenability, then [M:N] equals the square norm of the inclusion graph N ⊂ M.
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