Ends, tangles and critical vertex sets

Abstract

We show that an arbitrary infinite graph G can be compactified by its ends plus its critical vertex sets, where a finite set X of vertices of an infinite graph is critical if its deletion leaves some infinitely many components each with neighbourhood precisely equal to X. We further provide a concrete separation system whose 0-tangles are precisely the ends plus critical vertex sets. Our tangle compactification G is a quotient of Diestel's (denoted by G), and both use tangles to compactify a graph in much the same way as the ends of a locally finite and connected graph compactify it in its Freudenthal compactification. Finally, generalising both Diestel's construction of G and our construction of G, we show that G can be compactified by every inverse limit of compactifications of the sets of components obtained by deleting a finite set of vertices. Diestel's G is the finest such compactification, and our G is the coarsest one. Both coincide if and only if all tangles are ends. This answers two questions of Diestel.