On closed oriented surfaces in the 3-sphere
Abstract
In this paper we study embeddings of oriented connected closed surfaces in . We define a complete invariant, the fundamental span, for such embeddings, generalizing the notion of the peripheral system of a knot group. From the fundamental span, several computable invariants are derived and employed to study handlebody knots, bi-knotted surfaces, and chirality of knots. These invariants are capable to distinguish inequivalent handlebody knots and bi-knotted surfaces with homeomorphic complements. Particularly, we obtain an alternative proof of the inequivalence of Ishii et al.'s handlebody knots and , and also construct an infinite family of pairs of inequivalent bi-knotted surfaces with homeomorphic complements. An interpretation of Fox's invariant in terms of the fundamental span is discussed and used to show and in the Rolfsen knot table are chiral; their chirality is known to be undetectable by the Jones and HOMFLY-PT polynomials.
Cite
@article{arxiv.1902.05030,
title = {On closed oriented surfaces in the 3-sphere},
author = {Giovanni Bellettini and Maurizio Paolini and Yi-Sheng Wang},
journal= {arXiv preprint arXiv:1902.05030},
year = {2021}
}
Comments
33 pages, 26 figures, introduction shortened, details added to the satellite construction in Section 4.3