Simplicial volume of one-relator groups and stable commutator length

Abstract

A one-relator group is a group Gr that admits a presentation S r with a single relation r. One-relator groups form a rich classically studied class of groups in Geometric Group Theory. If r ∈ F(S)', the commutator subgroup of F(S), we introduce the simplicial volume of \| Gr \|. We relate this invariant to the stable commutator length sclS(r) of the element r ∈ F(S). We show that often (though not always) the linear relationship \| Gr \| = 4 · sclS(r) - 2 holds and that every rational number modulo 1 is the simplicial volume of a one-relator group. Moreover, we show that this relationship holds approximately for proper powers and for elements satisfying the small cancellation condition C'(1/N), with a multiplicative error of O(1/N). This allows us to prove for random elements of F(S)' of length n that \| Gr \| is 2 (2 |S| - 1)/3 · n / (n) + o(n/(n)) with high probability, using an analogous result of Calegari-Walker for stable commutator length.