A remark on the freeness condition of Suzuki's correspondence theorem for intermediate C-algebras
Abstract
Let be a discrete group satisfying the approximation property (AP). Let X, Y be -spaces and π Y X be a proper factor map which is injective on the non-free part. We prove the one-to-one correspondence between intermediate C-algebras of C0(X) r ⊂ C0(Y) and intermediate - C-algebras of C0(X) ⊂ C0(Y). This is a generalization of Suzuki's theorem that proves the statement for free actions.
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