Characters and II1-Factor Representations of Full Groups of Cantor Minimal Systems

Abstract

Let (X,T) be a Cantor minimal system, and let denote either its associated topological full group or the full group of a Bratteli diagram associated with (X,T). In this paper we describe the structure of indecomposable (extreme) characters and the associated II1-factor representations for the group and its commutator subgroup '. In particular, we prove that: (1) for every nontrivial indecomposable character of ', there exists a finite collection (with repetitions allowed) \μi\i∈ I of T-invariant ergodic measures on X such that (γ) = Πi∈ I μi(Fix(γ)), for every γ ∈ ', where Fix(γ) = \x∈ X : γ x = x\; and (2) each indecomposable character of is the product of an indecomposable character of the form Πi∈ I μi(Fix(γ)) and a homomorphism from into the unit circle. As a consequence, we show that any finite-type unitary representation of ' that does not contain a regular subrepresentation is automatically continuous with respect to the uniform topology on '. We also establish a general result on automatic continuity of finite-type unitary representations of infinite groups, which we use in our proofs.