Nilpotent groups with balanced presentations. II
Abstract
If G is a nilpotent group with a balanced presentation and G3 then β1(G;Q)≤2 Hi22. We show that if such a group G has an abelian normal subgroup A such that G/A2 then G is torsion-free and has Hirsch length h(G)≤4. On the other hand, if β1(G;Q)=1 and G has an abelian normal subgroup A such that G/A then G/mZnZ, for some m,n=0 such that m divides a power of n-1.
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