L. Rozansky
Published 2001-06-12Version 1
We formulate a conjecture (already proven by A. Kricker) about the structure of Kontsevich integral of a knot. We describe its value in terms of the generating functions for the numbers of external edges attached to closed 3-valent diagrams. We conjecture that these functions are rational functions of the exponentials of their arguments, their denominators being the powers of the Alexander-Conway polynomial. This conjecture implies the existence of an expansion of a colored Jones (HOMFLY) polynomial in powers of q-1 whose coefficients are rational functions of q^color. We show how to derive the first Kontsevich integral polynomial associated to the theta-graph from the rational expansion of the colored SU(3) Jones polynomial.
Comments: LaTeX, 35 pages, 3 pictures
On the universal sl_2 invariant of boundary bottom tangles
Spectral sequences of colored Jones polynomials, colored Rasmussen invariants and nanophrases
SL(2,C) Chern-Simons theory and the asymptotic behavior of the colored Jones polynomial
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