Abstract
We prove that, whenever G is a Polish group with metrizable universal minimal flow M(G), there exists a comeagre orbit in M(G). It then follows that there exists an extremely amenable, closed, co-precompact subgroup G* of G such that \$\$\M(G) = \backslashwidehat\G/G^*\\\$\$M(G)=G/G∗^.
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