Abstract
In this paper, in an attempt to extend an earlier work of Lück, we construct a knot invariant with parameter in C* by using the fundamental L2-representation of the fundamental group of the knot complement, which may be thought of as an L2-analogue of the usual Alexander polynomial of the knot in S3. When restricted to U(1) parameters, we interpret this invariant in terms of the U(1) twisted L2-Reidemeister torsion. We also show that this L2-invariant depends only on the norm |t| for t ∈ C*. In particular, this implies an unexpected rigidity property of the U(1) twisted L2-torsion on a knot complement. A possible relationship with the volume conjecture is discussed.
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