Subgroups of a complete ergodic approximately finite group of automorphisms, which preserve the measure of a Lebesgue space (Q1821897)

Let G be a countable subgroup of the group of measure preserving transformations A(X) of a Lebesgue space (X,\(\mu)\), [G] its full group and let N[G] denote its normalizer in A(X). In this note the following problem is solved: Given two countable ergodic subgroups \(H_ 1\), \(H_ 2\) of an approximately finite full group [G], when does there exist a \(g\in N[H]\) such that \(g[H_ 1]g^{-1}=[H_ 2]?\) The solution is given in terms of equality of two invariants defined in the paper.