Virtual concordance and the generalized Alexander polynomial Journal Articles

abstract

• We use the Bar-Natan Ж-correspondence to identify the generalized Alexander polynomial of a virtual knot with the Alexander polynomial of a two component welded link. We show that the Ж-map is functorial under concordance, and also that Satoh’s Tube map (from welded links to ribbon knotted tori in [Formula: see text]) is functorial under concordance. In addition, we extend classical results of Chen, Milnor and Hillman on the lower central series of link groups to links in thickened surfaces. Our main result is that the generalized Alexander polynomial vanishes on any knot in a thickened surface which is virtually concordant to a homologically trivial knot. In particular, this shows that it vanishes on virtually slice knots. We apply it to complete the calculation of the slice genus for virtual knots with four crossings and to determine non-sliceness for a number of 5-crossing and 6-crossing virtual knots.

authors

• Boden, Hans Ulysses
• Chrisman, Micah

status

• published 

publication date

• April 2021

has subject area

• 0101 Pure Mathematics (FoR)
• 0102 Applied Mathematics (FoR)
• General Mathematics (Science Metrix)

published in

• Journal of Knot Theory and its Ramifications  Journal

keywords

• COBORDISM
• INVARIANTS
• KNOT-GROUPS
• LINKS
• Mathematics
• Physical Sciences
• SURFACES
• Science & Technology
• Virtual knot
• boundary link
• concordance
• generalized Alexander polynomial
• lower central series
• ribbon torus link
• slice knot

Digital Object Identifier (DOI)

• 10.1142/s0218216521500309

start page

• 2150030

end page

• 2150030

volume

• 30

issue

• 05