Intrinsic symmetry groups of links with 8 and fewer crossings

TL;DR

This paper provides an elementary, constructive method to determine the intrinsic symmetry groups of links with up to 8 crossings, using invariants and explicit isotopies, refining previous computational approaches.

Contribution

It offers a new elementary approach to explicitly compute the intrinsic symmetry groups of small crossing links, including constructions for most cases and invariants-based exclusions.

Findings

Explicit isotopies for all links in the table are constructed.

Standard invariants suffice to determine symmetries for most links.

Additional Jones polynomial analysis is used for three exceptional links.

Abstract

We present an elementary derivation of the "intrinsic" symmetry groups for knots and links of 8 or fewer crossings. The standard symmetry group for a link is the mapping class group $\MCG(S^3,L)$ or $\Sym(L)$ of the pair $(S^3,L)$. Elements in this symmetry group can (and often do) fix the link and act nontrivially only on its complement. We ignore such elements and focus on the "intrinsic" symmetry group of a link, defined to be the image $\Sigma(L)$ of the natural homomorphism $\MCG(S^3,L) \rightarrow \MCG(S^3) \cross \MCG(L)$. This different symmetry group, first defined by Whitten in 1969, records directly whether $L$ is isotopic to a link $L'$ obtained from $L$ by permuting components or reversing orientations. For hyperbolic links both $\Sym(L)$ and $\Sigma(L)$ can be obtained using the output of \texttt{SnapPea}, but this proof does not give any hints about how to actually construct isotopies realizing $\Sigma(L)$. We show that standard invariants are enough to rule out all the isotopies outside $\Sigma(L)$ for all links except $7^2_6$, $8^2_{13}$ and $8^3_5$ where an additional construction is needed to use the Jones polynomial to rule out "component exchange" symmetries. On the other hand, we present explicit isotopies starting with the positions in Cerf's table of oriented links which generate $\Sigma(L)$ for each link in our table. Our approach gives a constructive proof of the $\Sigma(L)$ groups.