SL2(C)-Character Variety of a Hyperbolic Link and Regulator

Abstract

In this paper, we study the SL2(C) character variety of a hyperbolic link in S3. We analyze a special smooth projective variety Yh arising from some 1-dimensional irreducible slices on the character variety. We prove that a natural symbol obtained from these 1-dimensional slices is a torsion in K2( C(Yh)). By using the regulator map from K2 to the corresponding Deligne cohomology, we get some variation formulae on some Zariski open subset of Yh. From this we give some discussions on a possible parametrized volume conjecture for both hyperbolic links and knots.