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W4323557360 abstract "Let $(G_n)_{n in mathbb{N}}$ be a sequence of groups equipped with a $d$-ary cloning system and denote by $mathscr{T}_d(G_*)$ the resulting Thompson-like group. In previous work joint with Zaremsky, we obtained structural results concerning the group von Neumann algebra of $mathscr{T}_d(G_*)$, denoted by $L(mathscr{T}_d(G_*))$. Under some natural assumptions on the $d$-ary cloning system, we proved that $L(mathscr{T}_d(G_*))$ is a type $text{II}_1$ factor. With a few additional natural assumptions, we proved that $L(mathscr{T}_d(G_*))$ is, moreover, a McDuff factor. In this paper, we further analyze the structure of $L(mathscr{T}_d(G_*))$, in particular the inclusion $L(F_d) subseteq L(mathscr{T}_d(G_*))$, where $F_d$ is the smallest of the Higman--Thompson groups. First, we prove that if the $d$-ary cloning system is diverse, then the inclusion $L(F_d) subseteq L(mathscr{T}_d(G_*))$ is irreducible, a considerable improvement of the result that $L(mathscr{T}_d(G_*))$ is a type $text{II}_1$ factor. This allows us to compute the normalizer of $L(F_d)$ in $L(mathscr{T}_d(G_*))$, which turns out to be trivial in the diverse case, implying that the inclusion is also singular. Then we prove that the inclusion $L(F_d) subseteq L(mathscr{T}_d(G_*))$ satisfies the weak asymptotic homomorphism property, which yields another proof that the inclusion is singular. Finally, we finish the paper with an application: Using irreducibility, our conditions for when $L(mathscr{T}_d(G_*))$ is a type $text{II}_1$ McDuff factor, and the fact that $F_d$ is character rigid (in the sense of Peterson), we prove that the groups $F_d$ are McDuff (in the sense of Deprez-Vaes)." @default.
W4323557360 created "2023-03-09" @default.
W4323557360 creator A5048284951 @default.
W4323557360 date "2023-03-04" @default.
W4323557360 modified "2023-09-29" @default.
W4323557360 title "von Neumann Algebras of Thompson-like Groups from Cloning Systems II" @default.
W4323557360 doi "https://doi.org/10.48550/arxiv.2303.02533" @default.
W4323557360 hasPublicationYear "2023" @default.
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