Endomorphisms of the Cuntz Algebras and the Thompson Groups
Abstract
We investigate the relationship between endomorphisms of the Cuntz algebra O2 and endomorphisms of the Thompson groups F, T and V represented inside the unitary group of O2. For an endomorphism λu of O2, we show that λu(V)⊂eq V if and only if u∈ V. If λu is an automorphism of O2 then u∈ V is equivalent to λu(F)⊂eq V. Our investigations are facilitated by introduction of the concept of modestly scaling endomorphism of On, whose properties and examples are investigated.
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