The Ma-Qiu index and the Nakanishi index for a fibered knot are equal, and ω-solvability

Abstract

For a knot K in S3, let G(K) be the knot group of K, a(K) the Ma-Qiu index (the MQ index, for short), which is the minimal number of normal generators of the commutator subgroup of G(K), and m(K) the Nakanishi index of K, which is the minimal number of generators of the Alexander module of K.We generalize the notions for a pair of a group G and its normal sugroup N, and we denote them by a(G, N) and m(G, N) respectively.Then it is easy to see m(G, N) a(G, N) in general.We also introduce a notion ``ω-solvability" for a group that the intersection of all higher commutator subgroups is trivial.Our main theorem is that if N is ω-solvable, then we have m(G, N)=a(G, N).As corollaries, for a fibered knot K, we have m(K)=a(K), and we could determine the MQ indices of prime knots up to 9 crossings completely.