Negative immersions for one-relator groups

Abstract

We prove a freeness theorem for low-rank subgroups of one-relator groups. Let F be a free group, and let w∈ F be a non-primitive element. The primitivity rank of w, π(w), is the smallest rank of a subgroup of F containing w as an imprimitive element. Then any subgroup of the one-relator group G=F/ w generated by fewer than π(w) elements is free. In particular, if π(w)>2 then G doesn't contain any Baumslag--Solitar groups. The hypothesis that π(w)>2 implies that the presentation complex X of the one-relator group G has negative immersions: if a compact, connected complex Y immerses into X and (Y)≥ 0 then Y is Nielsen equivalent to a graph. The freeness theorem is a consequence of a dependence theorem for free groups, which implies several classical facts about free and one-relator groups, including Magnus' Freiheitssatz and theorems of Lyndon, Baumslag, Stallings and Duncan--Howie. The dependence theorem strengthens Wise's w-cycles conjecture, proved independently by the authors and Helfer--Wise, which implies that the one-relator complex X has non-positive immersions when π(w)>1.