Research ArticleNo Access

Goussarov–Polyak–Viro conjecture for degree three case

Graduate School of Mathematical Sciences, The University of Tokyo, 3-8-1, Komaba, Meguro-ku, Tokyo 153-8914, Japan

E-mail Address: nito@gm.ibaraki-ct.ac.jp

Corresponding author. Current Address: National Institute of Technology, Ibaraki College, 866 Nakane, Hitachinaka, Ibaraki 312-8508, Japan.

Search for more papers by this author

Yuka Kotorii

Mathematics Program, Graduate School of Advanced Science and Engineering, Hiroshima University 1-7-1 Kagamiyama Higashi-Hiroshima City, Hiroshima 739-8521, Japan

Interdisciplinary Theoretical & Mathematical, Sciences Program (iTHEMS) RIKEN 2-1, Hirosawa, Wako, Saitama 351-0198, Japan

E-mail Address: kotorii@hiroshima-u.ac.jp

Search for more papers by this author

, and

Masashi Takamura

School of Social Informatics, Aoyama Gakuin University, 5-10-1 Fuchinobe, Chuo-ku, Sagamihara-shi, Kanagawa-ken, 252-5258, Japan

E-mail Address: takamura@si.aoyama.ac.jp

Search for more papers by this author

https://doi.org/10.1142/S0218216522500195Cited by:2 (Source: Crossref)

Abstract

Although it is known that the dimension of the Vassiliev invariants of degree three of long virtual knots is seven, the complete list of seven distinct Gauss diagram formulas has been unknown explicitly, where only one known formula was revised without proof. In this paper, we give seven Gauss diagram formulas to present the seven invariants of the degree three (Proposition 4). We further give $23$ $23$ Gauss diagram formulas of classical knots (Proposition 5). In particular, the Polyak–Viro Gauss diagram formula [M. Polyak and O. Viro, Gauss diagram formulas for Vassiliev invariants, Int. Math. Res. Not.1994 (1994) 445–453] is not a long virtual knot invariant; however, it is included in the list of $23$ $23$ formulas. It has been unknown whether this formula would be available by arrow diagram calculus automatically. In consequence, as it relates to the conjecture of Goussarov-Polyak-Viro [Finite-type invariants of classical and virtual knots, Topology39 (2000) 1045–1068, Conjecture 3.C], for all the degree three finite type long virtual knot invariants, each Gauss diagram formula is represented as those of Vassiliev invariants of classical knots (Theorem 1).

Keywords:

AMSC: 57K16, 57K12, 57K10

References

1. D. Bar-Natan, I. Halacheva, L. Leung and F. Roukema , Some dimensions of spaces of finite type invariants of virtual knots, Exp. Math. 20 (2011) 282–287. Crossref, Web of Science, Google Scholar
2. J. S. Birman and X.-S. Lin , Knot polynomials and Vassiliev’s invariants, Invent. Math. 111 (1993) 225–270. Crossref, Web of Science, Google Scholar
3. S. Chmutov, S. Duzhin and J. Motovoy , Introduction to Vassiliev Knot Invariants (Cambridge University Press, Cambridge, 2012). Crossref, Google Scholar
4. S. Chmutov and M. Polyak , Elementary combinations of the HOMFLYPT polynomial, Int. Math. Res. Not. 2010 (2010) 483–495. Crossref, Web of Science, Google Scholar
5. C. Even-Zohar, J. Hass, N. Linial and T. Nowik , Invariants of random knots and links, Discrete Comput. Geom. 56 (2016) 274–314. Crossref, Web of Science, Google Scholar
6. T. Fiedler and A. Stoimenow , New knot and link invariants, in Knots in Hellas ’98 (Delphi), 59–79, Series on Knots Everything, Vol. 24 (World Scientific Publication, River Edge New Jersey, 2000). Link, Google Scholar
7. Y. Funakoshi, M. Hashizume, N. Ito, T. Kobayashi and H. Murai , A distance on the equivalence classes of spherical curves generated by deformations of type RI, J. Knot Theory Ramifications 27(12) (2018) 1850066. Link, Web of Science, Google Scholar
8. M. Goussarov, M. Polyak and O. Viro , Finite-type invariants of classical and virtual knots, Topology 39 (2000) 1045–1068. Crossref, Web of Science, Google Scholar
9. N. Ito , Knot Projections (CRC Press, Boca Paton, FL, 2016). Crossref, Google Scholar
10. N. Ito , Based chord diagrams of spherical curves, Kodai Math. J. 41 (2018) 375–396. Crossref, Web of Science, Google Scholar
11. N. Ito , Space on chord diagrams on spherical curves, Int. J. Math. 12 (2019) 1950060. Link, Web of Science, Google Scholar
12. N. Ito and A. Shimizu , The half-twisted splice operation on reduced knot projections, J. Knot Theory Ramifications 21 (2012) 1250112. Link, Web of Science, Google Scholar
13. N. Ito and M. Takamura , Arrow diagrams on spherical curves and computations, J. Knot Theory Ramifications 2150045. Web of Science, Google Scholar
14. L. H. Kauffman , Virtual knot theory, European J. Combin. 20 (1999) 663–690. Crossref, Web of Science, Google Scholar
15. O.-P. Östlund , A diagrammatic approach to link invariants of finite degree, Math. Scand. 94 (2004) 295–319. Crossref, Google Scholar
16. V. V. Parasolov and A. B. Sossinsky , Knots, links, braids and 3-manifolds, in An Introduction to the New Invariants in Low-Dimensional Topology, Translations of Mathematical Monographs, Vol. 154 (American Mathematical Society, Providence RI, 1997). Crossref, Google Scholar
17. M. Polyak , Minimal generating sets of Reidemeister moves, Quantum Topol. 1 (2010) 399–411. Crossref, Google Scholar
18. M. Polyak, Alexander-Conway invariants of tangles, preprint. Google Scholar
19. M. Polyak and O. Viro , Gauss diagram formulas for Vassiliev invariants, Int. Math. Res. Not. 1994(11) (1994) 445–453. Crossref, Google Scholar
20. M. Takamura, Order of relators, http://www.foliations.jp/takamura/knot/index.html. Google Scholar
21. V. Turaev , Lectures on topology of words, Japan J. Math. 2 (2007) 1–39. Crossref, Web of Science, Google Scholar
22. V. A. Vassiliev , Cohomology of knot spaces, in Theory of Singularities and its Applications, Advances in Soviet Mathematics (American Mathematical Society, RI Providence, 1990), pp. 23–69. Crossref, Google Scholar
23. O. Viro, Private communication. Google Scholar
24. S. Willerton, On the Vassiliev invariants for knots and pure braids, PhD thesis, University of Edinburgh (2003). Google Scholar