Sigma invariants for partial orders on nilpotent groups
Abstract
We prove that a map onto a nilpotent group Q has finitely generated kernel if and only if the preimage of the positive cone is coarsely connected as a subset of the Cayley graph for every full archimedean partial order on Q. In case Q is abelian, we recover the classical theorem that N is finitely generated if and only if S(G,N) ⊂eq 1(G). Furthermore, we provide a way to construct all such orders on nilpotent groups. A key step is to translate the classical setting based on characters into a language of orders on G.
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