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Abstract We investigate the notion of a semi-retraction between two first-order structures (in typically different signatures) that was introduced by the second author as a link between the Ramsey property and generalized indiscernible sequences. We look at semi-retractions through a new lens establishing transfers of the Ramsey property and finite Ramsey degrees under quite general conditions that are optimal as demonstrated by counterexamples. Finally, we compare semi-retractions to the category theoretic notion of a pre-adjunction.

Universal minimal flows of extensions of and by compact groups

https://doi.org/10.1017/etds.2022.52

BARTOŠOVÁ, DANA (August 2023, Ergodic Theory and Dynamical Systems)

Abstract Every topological group G has, up to isomorphism, a unique minimal G -flow that maps onto every minimal G -flow, the universal minimal flow $M(G).$ We show that if G has a compact normal subgroup K that acts freely on $M(G)$ and there exists a uniformly continuous cross-section from $G/K$ to $G,$ then the phase space of $M(G)$ is homeomorphic to the product of the phase space of $M(G/K)$ with K . Moreover, if either the left and right uniformities on G coincide or G is isomorphic to a semidirect product $$G/K\ltimes K$$ , we also recover the action, in the latter case extending a result of Kechris and Sokić. As an application, we show that the phase space of $M(G)$ for any totally disconnected locally compact Polish group G with a normal open compact subgroup is homeomorphic to a finite set, the Cantor set $$2^{\mathbb {N}}$$ , $$M(\mathbb {Z})$$ , or $$M(\mathbb {Z})\times 2^{\mathbb {N}}.$$

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