Semistability of Graph Products

Abstract

A graph product G on a graph is a group defined as follows: For each vertex v of there is a corresponding non-trivial group Gv. The group G is the quotient of the free product of the Gv by the commutation relations [Gv,Gw]=1 for all adjacent v and w in . A finitely presented group G has semistable fundamental group at ∞ if for some (equivalently any) finite connected CW-complex X with π1(X)=G, the universal cover X of X has the property that any two proper rays in X are properly homotopic. The class of finitely presented groups with semistable fundamental group at ∞ is known to contain many other classes of groups, but it is a 40 year old question as to whether or not all finitely presented groups have semistable fundamental group at ∞. Our main theorem is a combination result. It states that if G is a graph product on a finite graph and each vertex group is finitely presented, then G has non-semistable fundamental group at ∞ if and only if there is a vertex v of such that Gv is not semistable, and the subgroup of G generated by the vertex groups of vertices adjacent to v is finite (equivalently lk(v) is a complete graph and each vertex group of lk(v) is finite). Hence if one knows which vertex groups of G are not semistable and which are finite, then an elementary inspection of determines whether or not G has semistable fundamental group at ∞.