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Jacobians for Measures in Coset Spaces

Published online by Cambridge University Press:  18 May 2009

S. Świerczkowski
Affiliation:
The University Glasgow
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Let G be a locally compact topological group, let H be a closed subgroup and let G/H be the space of left cosets = xH with the natural topology. We denote by μ a non-negative measure in G/Hdefined on the ring of Baire sets. G acts by left multiplication as a transitive group of homeomorphisms on G/H: Every tG defines the homeomorphism We write, for EG/H, tE = . The measure μ is called stable (cf. [3], [4]) if from tG, E ⊂ G/H and μ(E) = 0 follows μ(tE) = 0. We say that μ is locally finite [3], [5] if every set of positive measure contains a subset of positive finite measure.

Type
Research Article
Copyright
Copyright © Glasgow Mathematical Journal Trust 1960

References

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4.Świerczkowski, S., Measures equivalent to the Haar measure, Proc. Glasgow Math. Assoc., 4 (1960), 157162.CrossRefGoogle Scholar
5.Zaanen, A. C., A note on measure theory, Nieuw Arch. Wisk. (3) 6 (1958), 5865.Google Scholar