Jump transformations and an embedding of ${\cal O}_{\infty}$ into ${\cal   O}_{2}$

Katsunori Kawamura; Dan Lascu; Ion Coltescu

arXiv:0809.4800·math.OA·November 13, 2009

Jump transformations and an embedding of ${\cal O}_{\infty}$ into ${\cal O}_{2}$

Katsunori Kawamura, Dan Lascu, Ion Coltescu

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Abstract

A measurable map $T$ on a measure space induces a representation $Π_{T}$ of a Cuntz algebra $O_{N}$ when $T$ satisfies a certain condition. For such two maps $τ$ and $σ$ and representations $Π_{τ}$ and $Π_{σ}$ associated with them, we show that $Π_{τ}$ is the restriction of $Π_{σ}$ when $τ$ is a jump transformation of $σ$ . Especially, the Gauss map $τ_{1}$ and the Farey map $σ_{1}$ induce representations $Π_{τ_{1}}$ of $O_{\infty}$ and that $Π_{σ_{1}}$ of $O_{2}$ , respectively, and $Π_{τ_{1}} = Π_{σ_{1}} ∣_{O_{\infty}}$ with respect to a certain embedding of $O_{\infty}$ into $O_{2}$ .

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