Deformations of metabelian representations of knot groups into SL(3,C)
Abstract
Let K be a knot in S3 and X its complement. We study deformations of reducible metabelian representations of the knot group π1(X) into SL(3,C) which are associated to a double root of the Alexander polynomial. We prove that these reducible metabelian representations are smooth points of the representation variety and that they have irreducible non metabelian deformations.
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