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Brieskorn Manifolds, Generalized Sieradski Groups, and Coverings of Lens Spaces. / Vesnin, A. Yu; Kozlovskaya, T. A.

в: Proceedings of the Steklov Institute of Mathematics, Том 304, 01.04.2019, стр. S175-S185.

Результаты исследований: Научные публикации в периодических изданияхстатьяРецензирование

Harvard

Vesnin, AY & Kozlovskaya, TA 2019, 'Brieskorn Manifolds, Generalized Sieradski Groups, and Coverings of Lens Spaces', Proceedings of the Steklov Institute of Mathematics, Том. 304, стр. S175-S185. https://doi.org/10.1134/S0081543819020196

APA

Vesnin, A. Y., & Kozlovskaya, T. A. (2019). Brieskorn Manifolds, Generalized Sieradski Groups, and Coverings of Lens Spaces. Proceedings of the Steklov Institute of Mathematics, 304, S175-S185. https://doi.org/10.1134/S0081543819020196

Vancouver

Vesnin AY, Kozlovskaya TA. Brieskorn Manifolds, Generalized Sieradski Groups, and Coverings of Lens Spaces. Proceedings of the Steklov Institute of Mathematics. 2019 апр. 1;304:S175-S185. doi: 10.1134/S0081543819020196

Author

Vesnin, A. Yu ; Kozlovskaya, T. A. / Brieskorn Manifolds, Generalized Sieradski Groups, and Coverings of Lens Spaces. в: Proceedings of the Steklov Institute of Mathematics. 2019 ; Том 304. стр. S175-S185.

BibTeX

@article{24731732ef4a4dd4b0e845c8ae34f9ac,
title = "Brieskorn Manifolds, Generalized Sieradski Groups, and Coverings of Lens Spaces",
abstract = "A Brieskorn manifold B(p, q, r) is the r-fold cyclic covering of the 3-sphere S3 branched over the torus knot T(p, q). Generalized Sieradski groups S(m, p, q) are groups with an m-cyclic presentation Gm(w), where the word w has a special form depending on p and q. In particular, S(m, 3, 2) = Gm(w) is the group with m generators x1,…, xm and m defining relations w(xi, xi+1, xi+2) = 1, where w(xi, xi+1, xi+2) = xi, xi+2, xi+1−1. Cyclic presentations of the groups S(2n, 3, 2) in the form Gn(w) were investigated by Howie and Williams, who showed that the n-cyclic presentations are geometric, i.e., correspond to spines of closed 3-manifolds. We establish a similar result for the groups S(2n, 5, 2). It is shown that in both cases the manifolds are n-fold branched cyclic coverings of lens spaces. To classify some of the constructed manifolds, we use Matveev{\textquoteright}s computer program “Recognizer”.",
keywords = "3-manifold, branched covering, Brieskorn manifold, cyclically presented group, lens space, Sieradski group",
author = "Vesnin, {A. Yu} and Kozlovskaya, {T. A.}",
year = "2019",
month = apr,
day = "1",
doi = "10.1134/S0081543819020196",
language = "English",
volume = "304",
pages = "S175--S185",
journal = "Proceedings of the Steklov Institute of Mathematics",
issn = "0081-5438",
publisher = "Maik Nauka Publishing / Springer SBM",

}

RIS

TY - JOUR

T1 - Brieskorn Manifolds, Generalized Sieradski Groups, and Coverings of Lens Spaces

AU - Vesnin, A. Yu

AU - Kozlovskaya, T. A.

PY - 2019/4/1

Y1 - 2019/4/1

N2 - A Brieskorn manifold B(p, q, r) is the r-fold cyclic covering of the 3-sphere S3 branched over the torus knot T(p, q). Generalized Sieradski groups S(m, p, q) are groups with an m-cyclic presentation Gm(w), where the word w has a special form depending on p and q. In particular, S(m, 3, 2) = Gm(w) is the group with m generators x1,…, xm and m defining relations w(xi, xi+1, xi+2) = 1, where w(xi, xi+1, xi+2) = xi, xi+2, xi+1−1. Cyclic presentations of the groups S(2n, 3, 2) in the form Gn(w) were investigated by Howie and Williams, who showed that the n-cyclic presentations are geometric, i.e., correspond to spines of closed 3-manifolds. We establish a similar result for the groups S(2n, 5, 2). It is shown that in both cases the manifolds are n-fold branched cyclic coverings of lens spaces. To classify some of the constructed manifolds, we use Matveev’s computer program “Recognizer”.

AB - A Brieskorn manifold B(p, q, r) is the r-fold cyclic covering of the 3-sphere S3 branched over the torus knot T(p, q). Generalized Sieradski groups S(m, p, q) are groups with an m-cyclic presentation Gm(w), where the word w has a special form depending on p and q. In particular, S(m, 3, 2) = Gm(w) is the group with m generators x1,…, xm and m defining relations w(xi, xi+1, xi+2) = 1, where w(xi, xi+1, xi+2) = xi, xi+2, xi+1−1. Cyclic presentations of the groups S(2n, 3, 2) in the form Gn(w) were investigated by Howie and Williams, who showed that the n-cyclic presentations are geometric, i.e., correspond to spines of closed 3-manifolds. We establish a similar result for the groups S(2n, 5, 2). It is shown that in both cases the manifolds are n-fold branched cyclic coverings of lens spaces. To classify some of the constructed manifolds, we use Matveev’s computer program “Recognizer”.

KW - 3-manifold

KW - branched covering

KW - Brieskorn manifold

KW - cyclically presented group

KW - lens space

KW - Sieradski group

UR - http://www.scopus.com/inward/record.url?scp=85067065539&partnerID=8YFLogxK

U2 - 10.1134/S0081543819020196

DO - 10.1134/S0081543819020196

M3 - Article

AN - SCOPUS:85067065539

VL - 304

SP - S175-S185

JO - Proceedings of the Steklov Institute of Mathematics

JF - Proceedings of the Steklov Institute of Mathematics

SN - 0081-5438

ER -

ID: 20586817