Finitely presented subgroups of direct products of graphs of groups with free abelian vertex groups

Abstract

A result by Bridson, Howie, Miller, and Short states that if S is a finitely presented subgroup of the direct product of free groups, then S is virtually a nilpotent extension of a direct product of free groups. Moreover, if S is a subgroup of type FPn of the direct product of n free groups, then the nilpotent extension is finite, so S is actually virtually the direct product of free groups. In this paper, these results are generalized to 2-dimensional coherent right-angled Artin groups. More precisely, we show that a finitely presented subgroup of the direct product of 2-dimensional coherent RAAGs is still virtually a nilpotent extension of a direct product of subgroups. If S is moreover a type FPn subgroup of the direct product of n 2-dimensional coherent RAAGs, then S is commensurable to a kernel of a character of a direct product of subgroups. Finally, we show that the multiple conjugacy problem and the membership problem are decidable for finitely presented subgroups of direct products of 2-dimensional coherent RAAGs.

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