Maximal equivariant compactifications

Abstract

Let G be a locally compact group. Then for every G-space X the maximal G-proximity βG can be characterized by the maximal topological proximity β as follows: A \ βG \ B ∃ V ∈ Ne \ \ \ VA \ β \ VB. Here, βG X βG X is the maximal G-compactification of X (which is an embedding for locally compact G), V is a neighborhood of e and A \ βG \ B means that the closures of A and B do not meet in βG X. Note that the local compactness of G is essential. This theorem comes as a corollary of a general result about maximal U-uniform G-compactifications for a useful wide class of uniform structures U on G-spaces for not necessarily locally compact groups G. It helps, in particular, to derive the following result. Let (U1,d) be the Urysohn sphere and G=Iso(U1,d) is its isometry group with the pointwise topology. Then for every pair of subsets A,B in U1, we have A \ βG \ B ∃ V ∈ Ne \ \ \ d(VA,VB) > 0. More generally, the same is true for any 0-categorical metric G-structure (M,d), where G:=Aut(M) is its automorphism group.