No Access

THE COMPLEX VOLUMES OF TWIST KNOTS VIA COLORED JONES POLYNOMIALS

Department of Mathematics, Faculty of Science and Engineering, Waseda University, 3-4-1 Okubo, Shinjuku-ku, Tokyo, 169-8555, Japan

Search for more papers by this author

and

JUN MURAKAMI

Department of Mathematics, Faculty of Science and Engineering, Waseda University, 3-4-1 Okubo, Shinjuku-ku, Tokyo, 169-8555, Japan

Search for more papers by this author

https://doi.org/10.1142/S0218216510008443Cited by:7 (Source: Crossref)

Abstract

For a hyperbolic knot, an ideal triangulation of the knot complement corresponding to the colored Jones polynomial was introduced by Thurston. Considering this triangulation of a twist knot, we find a function which gives the hyperbolicity equations and the complex volume of the knot complement, using Zickert's theory of the extended Bloch group and the complex volume.

We also consider a formal approximation of the colored Jones polynomial. Following Ohnuki's theory of 2-bridge knots, we define another function which comes from the approximation. We show that this function is essentially the same as the previous function, and therefore it also gives the same hyperbolicity equations and the complex volume.

Finally we compare this result with our previous one which dealt with Yokota theory, and, as an application to Yokota theory, present a refined formula of the complex volumes for any twist knots.

Keywords:

AMSC: 57M27, 51M25, 58J28

References

J. Cho, J. Murakami and Y. Yokota, Proc. Amer. Math. Soc. 137, 3533 (2009), DOI: 10.1090/S0002-9939-09-09906-7. Crossref, Web of Science, Google Scholar
J. Hoste and P. D. Shanahan, J. Knot Theory Ramifications 10(4), 625 (2001), DOI: 10.1142/S0218216501001049. Link, Web of Science, Google Scholar
R. Kashaev, Lett. Math. Phys. 39(3), 269 (1997), DOI: 10.1023/A:1007364912784. Crossref, Web of Science, Google Scholar
L. Lewin, Structural Properties of Polylogarithms, Mathematical Survey and Monographs 37, ed. L. Lewin (American Mathematical Society, Providence, RI, 1991) pp. 1–10. Crossref, Google Scholar
H. Murakami , The asymptotic behavior of the colored Jones function of a knot and its volume , Proceedings of "Art of Low Dimensional Topology VI" , ed. T. Kohno ( 2000 ) . Google Scholar
H. Murakami and J. Murakami, Acta Math. 186(1), 85 (2001), DOI: 10.1007/BF02392716. Crossref, Web of Science, Google Scholar
H. Murakamiet al., Experiment. Math. 11(3), 427 (2002). Crossref, Web of Science, Google Scholar
W. Neumann, Geom. Topol. 8, 413 (2004), DOI: 10.2140/gt.2004.8.413. Crossref, Web of Science, Google Scholar
K. Ohnuki, J. Knot Theory Ramifications 14(6), 751 (2005), DOI: 10.1142/S021821650500407X. Link, Web of Science, Google Scholar
M. Sakuma and J. Weeks, Japan. J. Math. (N.S.) 21(2), 393 (1995). Crossref, Web of Science, Google Scholar
D. Thurston, Hyperbolic volume and the Jones polynomial, Lecture notes at "Invariants de nuds et de varietes de dimension 3" (Institut Fourier, Grenoble, 1999) . Google Scholar
Y. Yokota , J. Knot Theory Ramifications . Google Scholar
C. Zickert, Duke Math. J. 150(3), 489 (2001), DOI: 10.1215/00127094-2009-058. Crossref, Web of Science, Google Scholar