Simplices of maximally amenable extensions in II1 factors
Abstract
For every n∈ N we obtain a separable II1 factor M and a maximally abelian subalgebra A⊂ M such that the space of maximally amenable extensions of A in M is affinely identified with the n dimensional R-simplex. This moreover yields first examples of masas in II1 factors A⊂ M admitting exactly n maximally amenable factorial extensions. Our examples of such M are group von Neumann algebras of free products of lamplighter groups amalgamated over the acting group. A conceptual ingredient that goes into obtaining this result is a simultaneous relative asymptotic orthogonality property, extending prior works in the literature. The proof uses technical tools including our uniform-flattening strategy for commutants in ultrapowers of II1 factors.
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