Shadows, ribbon surfaces, and quantum invariants
Geometric Topology
2015-03-20 v2
Abstract
Eisermann has shown that the Jones polynomial of a -component ribbon link is divided by the Jones polynomial of the trivial -component link. We improve this theorem by extending its range of application from links in to colored knotted trivalent graphs in , the connected sum of copies of . We show in particular that if the Kauffman bracket of a knot in has a pole in of order , the ribbon genus of the knot is at least . We construct some families of knots in for which this lower bound is sharp and arbitrarily big. We prove these estimates using Turaev shadows.
Keywords
Cite
@article{arxiv.1404.5983,
title = {Shadows, ribbon surfaces, and quantum invariants},
author = {Alessio Carrega and Bruno Martelli},
journal= {arXiv preprint arXiv:1404.5983},
year = {2015}
}
Comments
38 pages, 18 figures