A local quantization principle for inclusions of tracial von Neumann algebras

Abstract

We study the local quantization principle (after Sorin Popa~popa 94 and popa 95) of inclusions of tracial von Neumann algebras. Let (M,τ) be a type II1 von Neumann algebra and let N⊂eq M be a type II1 von Neumann subalgebra. Let x1,…, xm ∈ M and ε> 0. Then there exists a partition of 1 with projections p1, …, pn in N such that \[\|Σi=1n pi(xj-EN' M(xj))pi\|2<ε, 1≤ j≤ m.\] In particular, if N⊂eq M is an inclusion of type II1 factors with [M:N]=2, then for any x1,…, xm∈ M, there exists a partition of 1 with projections p1, …, pn in N such that \[Σi=1n pixjpi=τ(xj)1, 1≤ j≤ m.\] Equivalently, there exists a unitary operator u∈ N such that \[1nΣi=1nu*ixj ui=τ(xj)1, 1≤ j≤ m.\]