Deforming abelian elliptic SL(2,R)--representations of knot groups
Abstract
The following criterion is proved in this paper. If the Alexander polynomial of a knot K⊂ S3 has a zero of odd order on the complex unit circle, then there exists a continuous family of irreducible representations π1(S3 K) SL(2,R) converging to an abelian representation of noncentral elliptic type. As an application, the author shows that the Alexander polynomial of any nontrivial L-space knot satisfies the condition of the criterion. In particular, it follows that the fundamental group of any nontrivial L-space knot complement admits an irreducible SL(2,R)--representation.
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