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A note an homeomorphic measures on topological groups
Published online by Cambridge University Press: 20 January 2009
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The classical von Neumann–Oxtoby–Ulam Theorem states the following:
Given non-atomic Borel probability measures μ, λ on In such that
there exists a homeomorphism h of In onto itself fixing the boundary pointwise such that for any λ-measurable set S
It is known that the above theorem remains valid if In is replaced by any compact finite dimensional manifold [2], [4] or with I∞, the Hilbert cube, [8].
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- Research Article
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- Copyright © Edinburgh Mathematical Society 1983
References
REFERENCES
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8.Oxtoby, J. C. and Prasad, V. S., Homeomorphic measures in the Hilbert cube, Pacific J. Math. 77 (1978), 483–497.CrossRefGoogle Scholar
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