Examples of mixing subalgebras of von Neumann algebras and their normalizers

Abstract

We discuss different mixing properties for triples of finite von Neumann algebras B⊂ N⊂ M, and we introduce families of triples of groups H<K<G whose associated von Neumann algebras L(H)⊂ L(K)⊂ L(G) satisfy NL(G)(L(H))"=L(K). It turns out that the latter equality is implied by two conditions: the equality NG(H)=K and the above mentioned mixing properties. Our families of examples also allow us to exhibit examples of pairs H<G such that L(NG(H))=NL(G)(L(H))".