Knot Groups and Residual Nilpotence

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Knot Groups and Residual Nilpotence. / Bardakov, V. G.; Neshchadim, M. V.

In: Proceedings of the Steklov Institute of Mathematics, Vol. 304, 01.04.2019, p. S23-S30.

Research output: Contribution to journal › Article › peer-review

Harvard

Bardakov, VG & Neshchadim, MV 2019, 'Knot Groups and Residual Nilpotence', Proceedings of the Steklov Institute of Mathematics, vol. 304, pp. S23-S30. https://doi.org/10.1134/S0081543819020044

APA

Bardakov, V. G., & Neshchadim, M. V. (2019). Knot Groups and Residual Nilpotence. Proceedings of the Steklov Institute of Mathematics, 304, S23-S30. https://doi.org/10.1134/S0081543819020044

Vancouver

Bardakov VG , Neshchadim MV. Knot Groups and Residual Nilpotence. Proceedings of the Steklov Institute of Mathematics. 2019 Apr 1;304:S23-S30. doi: 10.1134/S0081543819020044

Author

Bardakov, V. G. ; Neshchadim, M. V. / Knot Groups and Residual Nilpotence. In: Proceedings of the Steklov Institute of Mathematics. 2019 ; Vol. 304. pp. S23-S30.

BibTeX

@article{b3eb248f0c524c7e9c1b9e6eb9876b30,

title = "Knot Groups and Residual Nilpotence",

abstract = "We study groups of classical links, welded links, and virtual links. For classical braids, it is proved that the closures of a braid and its automorphic image are weakly equivalent. This implies the affirmative answer to the question of the coincidence of the groups constructed from a braid and from its automorphic image. We also study the problem of residual nilpotence of groups of virtual knots. It is known that, in a classical knot group, the commutator subgroup coincides with the third term of the lower central series and, hence, the quotient by the terms of the lower central series yields nothing. We prove that the situation is different for virtual knots. A nontrivial homomorphism of the virtual trefoil group to a nilpotent group of class 4 is constructed. We use the Magnus representation of a free group by power series to construct a homomorphism of the virtual trefoil group to a finite-dimensional algebra. This produces the nontrivial linear representation of the virtual trefoil group by unitriangular matrices of order 8.",

keywords = "groups, links, virtual knots",

author = "Bardakov, {V. G.} and Neshchadim, {M. V.}",

year = "2019",

month = apr,

day = "1",

doi = "10.1134/S0081543819020044",

language = "English",

volume = "304",

pages = "S23--S30",

journal = "Proceedings of the Steklov Institute of Mathematics",

issn = "0081-5438",

publisher = "Maik Nauka Publishing / Springer SBM",

}

RIS

TY - JOUR

T1 - Knot Groups and Residual Nilpotence

AU - Bardakov, V. G.

AU - Neshchadim, M. V.

PY - 2019/4/1

Y1 - 2019/4/1

N2 - We study groups of classical links, welded links, and virtual links. For classical braids, it is proved that the closures of a braid and its automorphic image are weakly equivalent. This implies the affirmative answer to the question of the coincidence of the groups constructed from a braid and from its automorphic image. We also study the problem of residual nilpotence of groups of virtual knots. It is known that, in a classical knot group, the commutator subgroup coincides with the third term of the lower central series and, hence, the quotient by the terms of the lower central series yields nothing. We prove that the situation is different for virtual knots. A nontrivial homomorphism of the virtual trefoil group to a nilpotent group of class 4 is constructed. We use the Magnus representation of a free group by power series to construct a homomorphism of the virtual trefoil group to a finite-dimensional algebra. This produces the nontrivial linear representation of the virtual trefoil group by unitriangular matrices of order 8.

AB - We study groups of classical links, welded links, and virtual links. For classical braids, it is proved that the closures of a braid and its automorphic image are weakly equivalent. This implies the affirmative answer to the question of the coincidence of the groups constructed from a braid and from its automorphic image. We also study the problem of residual nilpotence of groups of virtual knots. It is known that, in a classical knot group, the commutator subgroup coincides with the third term of the lower central series and, hence, the quotient by the terms of the lower central series yields nothing. We prove that the situation is different for virtual knots. A nontrivial homomorphism of the virtual trefoil group to a nilpotent group of class 4 is constructed. We use the Magnus representation of a free group by power series to construct a homomorphism of the virtual trefoil group to a finite-dimensional algebra. This produces the nontrivial linear representation of the virtual trefoil group by unitriangular matrices of order 8.

KW - groups

KW - links

KW - virtual knots

UR - http://www.scopus.com/inward/record.url?scp=85066997671&partnerID=8YFLogxK

U2 - 10.1134/S0081543819020044

DO - 10.1134/S0081543819020044

M3 - Article

AN - SCOPUS:85066997671

VL - 304

SP - S23-S30

JO - Proceedings of the Steklov Institute of Mathematics

JF - Proceedings of the Steklov Institute of Mathematics

SN - 0081-5438

ER -

ID: 20586663