Universal minimal flows of homeomorphism groups of continua
Abstract
We define a combinatorial property of a projective Fraisse category which we call the approximate Ramsey property. Let F be a continuum, G a closed subgroup of the homeomorphism group of F, and F the limit of projective Fraisse category F such that Aut(F) is dense in G. We prove that F has the approximate Ramsey property if and only if G is extremely amenable. We prove that the group of homeomorphisms of the universal pseudo-solenoid has non-metrizable universal minimal flow.
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