Given an -periodic link , we show that the Khovanov spectrum constructed by Lipshitz and Sarkar admits a group action. We relate the Borel cohomology of to the equivariant Khovanov homology of constructed by the second author. The action of Steenrod algebra on the cohomology of gives an extra structure of the periodic link. Another consequence of our construction is an alternative proof of the localization formula for Khovanov homology, obtained first by Stoffregen and Zhang. By applying the Dwyer-Wilkerson theorem we express Khovanov homology of the quotient link in terms of equivariant Khovanov homology of the original link.
Download full-text PDF |
Source |
|---|---|
| http://www.ncbi.nlm.nih.gov/pmc/articles/PMC8550572 | PMC |
| http://dx.doi.org/10.1007/s00208-021-02157-y | DOI Listing |
Publication Analysis
Top Keywords
Similar Publications
This is a companion paper to earlier work of the authors (Preprint, arXiv:1604.03466, 2016), which interprets the Heegaard Floer homology for a manifold with torus boundary in terms of immersed curves in a punctured torus. We establish a variety of properties of this invariant, paying particular attention to its relation to knot Floer homology, the Thurston norm, and the Turaev torsion.
View Article and Find Full Text PDFKhovanov homotopy type, periodic links and localizations.
Math Ann
February 2021
Institute of Mathematics, Polish Academy of Sciences, ul. Śniadeckich 8, 00-656 Warsaw, Poland.
Given an -periodic link , we show that the Khovanov spectrum constructed by Lipshitz and Sarkar admits a group action. We relate the Borel cohomology of to the equivariant Khovanov homology of constructed by the second author. The action of Steenrod algebra on the cohomology of gives an extra structure of the periodic link.
View Article and Find Full Text PDFWant AI Summaries of new PubMed Abstracts delivered to your In-box?
Enter search terms and have AI summaries delivered each week - change queries or unsubscribe any time!