Distinguishing the generalised knot groups of square and granny knot analogues

Abstract

Given a knot K we may construct a group Gn(K) from the fundamental group of K by adjoining an nth root of the meridian that commutes with the corresponding longitude. For n≥2 these "generalised knot groups" determine K up to reflection (Nelson and Neumann, 2008; arXiv:0804.0807). The second author has shown that for n≥2, the generalised knot groups of the square knot SK and the granny knot GK can be distinguished by counting homomorphisms into a suitably chosen finite group (arXiv:0706.1807). We extend this result to certain generalised knot groups of square and granny knot analogues SKa,b=Ta,b\# T-a,b, GKa,b=Ta,b\# Ta,b, constructed as connect sums of (a,b)-torus knots of opposite or identical chiralities. More precisely, for coprime a,b≥2 and n satisfying a certain coprimality condition with a and b, we construct an explicit finite group G (depending on a, b and n) such that Gn(SKa,b) and Gn(GKa,b) can be distinguished by counting homomorphisms into G. The coprimality condition includes all n≥2 coprime to ab. The result shows that the difference between these two groups can be detected using a finite group.