On number of ends of graph products of groups

Abstract

Given a finite simplicial graph =(V,E) with a vertex-labelling :V→\non-trivial finitely generated groups\, the graph product G is the free product of the vertex groups (v) with added relations that imply elements of adjacent vertex groups commute. For a quasi-isometric invariant P, we are interested in understanding under which combinatorial conditions on the graph the graph product G has property P. In this article our emphasis is on number of ends of a graph product G. In particular, we obtain a complete characterization of number of ends of a graph product of finitely generated groups.