Torus-covering knot groups and their irreducible metabelian SU(2)-representations
Abstract
A torus-covering T2-knot is a surface-knot of genus one determined from a pair of commutative braids. For a torus-covering T2-knot F, we determine the number of irreducible metabelian SU(2)-representations of the knot group of F in terms of the knot determinant of F. It is similar to the result due to Lin for the knot group of a classical knot. Further, we investigate the number of irreducible metabelian SU(2)-representations using Fox's p-colorability.
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