Compact Group Homeomorphisms Preserving The Haar Measure

Abstract

This paper studies the measure-preserving homeomorphisms on compact groups and proposes new methods for constructing measure-preserving homeomorphisms on direct products of compact groups and non-commutative compact groups. On the direct product of compact groups, we construct measure-preserving homeomorphisms using the method of integration. In particular, by applying this method to the \(n\)-dimensional torus \(Tn\), we can construct many new examples of measure-preserving homeomorphisms. We completely characterize the measure-preserving homeomorphisms on the two-dimensional torus where one coordinate is a translation depending on the other coordinate, and generalize this result to the \(n\)-dimensional torus. For non-commutative compact groups, we generalize the concept of the normalizer subgroup \(N( H)\) of the subgroup \(H\) to the normalizer subset \(EK( P)\) from the subset \(K\) to the subset \(P\) of the group of measure-preserving homeomorphisms. We prove that if \(μ\) is the unique \(K\)-invariant measure, then the elements in \(EK( P)\) also preserve \(μ\). In some non-commutative compact groups the normalizer subset \(EG( AF( G) )\) can give non-affine homeomorphisms that preserve the Haar measure. Finally, we prove that when \(G\) is a finite cyclic group and a \(n\)-dimensional torus, then \(AF( G)= N( G) = EG( AF( G) )\).

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