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On polish groups admitting a compatible complete left-invariant metric
Journal of Symbolic Logic 76 (2):437 - 447 (2011)
Abstract
We prove that the set of all Polish groups admitting a compatible complete left-invariant metric (called CLI) is coanalytic non-Borel as a subset of a standard Borel space of all Polish groups. As an application of this result, we show that there does not exist a weakly universal CLI group. This, in particular, answers in the negative a question of H.BeckerLinks
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Citations of this work
A Hierarchy on Non-Archimedean Polish Groups Admitting a Compatible Complete Left-Invariant Metric.Longyun Ding & Xu Wang - forthcoming - Journal of Symbolic Logic:1-19.
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