Isoperimetric functions for graph products
Abstract
Let be a finite graph, and for each vertex i let Gi be a finitely presented group. Let G be the graph product of the Gi. That is, G is the group obtained from the free product of the Gi by factoring out by the smallest normal subgroup containing all [g,h] where g∈ Gi and h∈ Gj and there is an edge joining i and j . We show that G has an isoperimetric function of degree k 2 (or an exponential isoperimetric function) if each vertex group has such an isoperimetric function.
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