The generalized volume conjecture for the figure-eight knot parametrized by a complex number with small imaginary part
Abstract
We study the asymptotic behavior, as N tends to infinity, of the N-dimensional colored Jones polynomial of the figure-eight knot, evaluated at (/N) for a complex parameter with 0<Im<π/2. We prove that if Re is large the colored Jones polynomial grows exponentially with growth rate expressed by the Chern--Simons invariant, and that if Re is small it converges to the reciprocal of the Alexander polynomial evaluated at .
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