On the action of the group of isometries on a locally compact metric space

Abstract

In this short note we give an answer to the following question. Let X be a locally compact metric space with group of isometries G. Let \gi\ be a net in G for which gix converges to y, for some x,y∈ X. What can we say about the convergence of \gi\? We show that there exist a subnet \gj\ of \gi\ and an isometry f:Cx X such that gj converges to f pointwise on Cx and f(Cx)=Cf(x), where Cx and Cy denote the pseudo-components of x and y respectively. Applying this we give short proofs of the van Dantzig--van der Waerden theorem (1928) and Gao--Kechris theorem (2003).