TY - JOUR
T1 - The rational classification of links of codimension > 2
AU - Crowley, Diarmuid J.
AU - Ferry, Steven C.
AU - Skopenkov, Mikhail
N1 - KAUST Repository Item: Exported on 2020-10-01
Acknowledgements: The third author was supported in part by INTAS grant 06-1000014-6277, Moebius Contest Foundation for Young Scientists and Euler Foundation.
PY - 2014/1/1
Y1 - 2014/1/1
N2 - Let m and p1,.,pr < m - 2 be positive integers. The set of links of codimension > 2, Em(∐k=1 rSPk), is the set of smooth isotopy classes of smooth embeddings ∐k=1 rSPk → Sm. Haefliger showed that Em(∐k=1 rSPk) is a finitely generated abelian group with respect to embedded connected summation and computed its rank in the case of knots, i.e. r = 1. For r > 1 and for restrictions on p1,.,pr the rank of this group can be computed using results of Haefliger or Nezhinsky. Our main result determines the rank of the group Em(∐k=1 rSPk) in general. In particular we determine precisely when Em(∐k=1 rSPk) is finite. We also accomplish these tasks for framed links. Our proofs are based on the Haefliger exact sequence for groups of links and the theory of Lie algebras. © de Gruyter 2014.
AB - Let m and p1,.,pr < m - 2 be positive integers. The set of links of codimension > 2, Em(∐k=1 rSPk), is the set of smooth isotopy classes of smooth embeddings ∐k=1 rSPk → Sm. Haefliger showed that Em(∐k=1 rSPk) is a finitely generated abelian group with respect to embedded connected summation and computed its rank in the case of knots, i.e. r = 1. For r > 1 and for restrictions on p1,.,pr the rank of this group can be computed using results of Haefliger or Nezhinsky. Our main result determines the rank of the group Em(∐k=1 rSPk) in general. In particular we determine precisely when Em(∐k=1 rSPk) is finite. We also accomplish these tasks for framed links. Our proofs are based on the Haefliger exact sequence for groups of links and the theory of Lie algebras. © de Gruyter 2014.
UR - http://hdl.handle.net/10754/563325
UR - https://www.degruyter.com/view/j/form.2014.26.issue-1/form.2011.158/form.2011.158.xml
UR - http://www.scopus.com/inward/record.url?scp=84925450485&partnerID=8YFLogxK
U2 - 10.1515/FORM.2011.158
DO - 10.1515/FORM.2011.158
M3 - Article
SN - 0933-7741
VL - 26
SP - 239
EP - 269
JO - Forum Mathematicum
JF - Forum Mathematicum
IS - 1
ER -