Enveloping Ellis semigroups as compactifications of transformations groups

Abstract

The notion of a proper Ellis semigroup compactification is introduced. Ellis's functional approach shows how to obtain them from totally bounded equiuniformities on a phase space X when the acting group G is with the topology of pointwise convergence and the G-space (G, X, ) is G-Tychonoff. The correspondence between proper Ellis semigroup compactifications of a topological group and special totally bounded equiuniformities (called Ellis equiuniformities) on a topological group is established. The Ellis equiuniformity on a topological transformation group G from the maximal equiuniformity on a phase space G/H in the case of its uniformly equicontinuous action is compared with Roelcke uniformity on G. Proper Ellis semigroup compactifications are described for groups S\,(X) (the permutation group of a discrete space X) and Aut\,(X) (automorphism group of an ultrahomogeneous chain X) in the permutation topology. It is shown that this approach can be applied to the unitary group of a Hilbert space.

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