Diamonds: Homology and the Central Series of Groups

Abstract: We establish an analog of a theorem of Stallings which asserts the homomorphisms between the universal nilpotent quotients induced by a homomorphism $G \to H$ of groups are isomorphisms provided a pair of homological conditions are satisfied. Our analogy does not have a homomorphism between $G$ and $H$ but instead we have a diamond of groups containing $G,H$ that satisfies a similar homological condition. We derive a few applications of this result. First, we show that there exist non-isomorphic number fields whose absolute Galois groups have isomorphic universal nilpotent quotients. We show that there exists pairs of non-isometric hyperbolic $n$-manifolds whose fundamental groups are residually nilpotent and have isomorphic universal nilpotent quotients. These are the first examples of residually nilpotent Kleinian groups with arbitrarily large nilpotent genus. Complex hyperbolic 2-manifold examples are given which also supply examples of surfaces whose geometric fundamental groups have the isomorphic universal nilpotent quotients and the isomorphisms are compatible with the outer Galois actions. The case of Riemann surfaces provides examples of curves where the same implication holds. In fact, for every $g \geq 2$, we show all but finitely many curves in $\mathcal{M}_g$ have finite covers where this happens.