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On transverse invariants from Khovanov homology

Publication ,  Journal Article
Lipshitz, R; Ng, L; Sarkar, S
Published in: Quantum Topology
September 9, 2015
Published version (DOI) Open Access Copy (Duke)

In [31], O. Plamenevskaya associated to each transverse knot K an element of the Khovanov homology of K. In this paper, we give two re_nements of Plamenevskaya’s invariant, one valued in Bar-Natan’s deformation (from [2]) of the Khovanov complex and another as a cohomotopy element of the Khovanov spectrum (from [20]). We show that the first of these refinements is invariant under negative flypes and SZ moves; this implies that Plamenevskaya’s class is also invariant under these moves. We go on to show that for small-crossing transverse knots K, both re_nements are determined by the classical invariants of K.

Duke Scholars

Lenhard Lee Ng
Author Lenhard Lee Ng Mathematics

Published In

Quantum Topology

DOI

10.4171/QT/69

EISSN

1664-073X

ISSN

1663-487X

Publication Date

September 9, 2015

Volume

6

Issue

3

Start / End Page

475 / 513

Related Subject Headings

  • 4904 Pure mathematics
  • 4902 Mathematical physics
  • 0105 Mathematical Physics
  • 0101 Pure Mathematics
 

Citation

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Lipshitz, R., Ng, L., & Sarkar, S. (2015). On transverse invariants from Khovanov homology. Quantum Topology, 6(3), 475–513. https://doi.org/10.4171/QT/69
Lipshitz, R., L. Ng, and S. Sarkar. “On transverse invariants from Khovanov homology.” Quantum Topology 6, no. 3 (September 9, 2015): 475–513. https://doi.org/10.4171/QT/69.
Lipshitz R, Ng L, Sarkar S. On transverse invariants from Khovanov homology. Quantum Topology. 2015 Sep 9;6(3):475–513.
Lipshitz, R., et al. “On transverse invariants from Khovanov homology.” Quantum Topology, vol. 6, no. 3, Sept. 2015, pp. 475–513. Scopus, doi:10.4171/QT/69.
Lipshitz R, Ng L, Sarkar S. On transverse invariants from Khovanov homology. Quantum Topology. 2015 Sep 9;6(3):475–513.

Published In

Quantum Topology

DOI

10.4171/QT/69

EISSN

1664-073X

ISSN

1663-487X

Publication Date

September 9, 2015

Volume

6

Issue

3

Start / End Page

475 / 513

Related Subject Headings

  • 4904 Pure mathematics
  • 4902 Mathematical physics
  • 0105 Mathematical Physics
  • 0101 Pure Mathematics