An example of an infinite amenable group with the ISR property

Abstract

Let G be SN, the finitary permutation (i.e. permutations with finite support) group on positive integers N. We prove that G has the invariant von Neumann subalgebras rigidity (ISR, for short) property as introduced in Amrutam-Jiang's work. More precisely, every G-invariant von Neumann subalgebra P⊂eq L(G) is of the form L(H) for some normal sugbroup H G and in this case, H=\e\, AN or G, where AN denotes the finitary alternating group on N, i.e. the subgroup of all even permutations in SN. This gives the first known example of an infinite amenable group with the ISR property.

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