J. O. Button
Published 2007-03-23Version 1
We show that the commutator subgroup G' of a classical knot group G need not have subgroups of every finite index, but it will if G' has a surjective homomorphism to the integers and we give an exact criterion for that to happen. We also give an example of a smoothly knotted n-sphere in the (n+2)-sphere for all n at least 2 whose infinite cyclic cover is not simply connected but has no proper finite covers.
Linking numbers in rational homology 3-spheres, cyclic branched covers and infinite cyclic covers
Virtual Knot Groups
Conjugation-invariant norms on the commutator subgroup of the infinite braid group
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