Proof of the Noferini-Williams conjecture for Gilbert-Howie groups

Abstract

The Gilbert-Howie groups H(n,m) form a notable subclass within the broader family of Fibonacci-type cyclically presented groups Gn(m,k). Noferini and Williams conjectured that the abelianization H(n,m)ab is torsion-free with Z-rank 2 if and only if n 06 and m 2n. We confirm this conjecture by proving that Res(F,G)=1, where F=(1+tm-t)/6 and G=(tn-1)/6, with 6 denoting the sixth cyclotomic polynomial. The proof uses a minimality argument, reducing the general problem to three cases: m=2+n/3, m=2+n/2, and m=2+2n/3. These cases are handled using polynomial resultant analysis and field-theoretic methods. As a consequence, we complete the classification of all Gn(m,k) that arise as labelled oriented graph groups.