Non-acyclic SL2-representations of twist knots, -3-Dehn surgeries, and L-functions

Abstract

We study irreducible SL2-representations of twist knots. We first determine all non-acyclic SL2(C)-representations, which turn out to lie on a line denoted as x=y in R2. Our main tools are character variety, Reidemeister torsion, and Chebyshev polynomials. We also verify a certain common tangent property, which yields a result on the L-functions of universal deformations, that is, the orders of the associated knot modules. Secondly, we prove that a representation is on the line x=y if and only if it factors through the (-3)-Dehn surgery, and is non-acyclic if and only if the image of a certain element is of order 3. Finally, we study absolutely irreducible non-acyclic representations over a finite field with characteristic p>2 to concretely determine all non-trivial L-functions L of the universal deformations over a CDVR. We show among other things that L = kn(x)2 holds for a certain series kn(x) of polynomials.