Symmetry groups of hyperbolic links and their complements

Abstract

We explicitly construct a sequence of hyperbolic links \ L4n \ where the number of symmetries of each S3 L4n that are not induced by symmetries of the pair (S3, L4n) grows linearly with n. Specifically, [Sym(S3 L4n) : Sym(S3, L4n)] =8n → ∞ as n → ∞. For this construction, we start with a family of minimally twisted chain links, \ C4n \, where Sym(S3, C4n) and Sym(S3 C4n) coincide and grow linearly with n. We then perform a particular type of homeomorphism on S3 C4n to produce another link complement S3 L4n where we can uniformly bound |Sym(S3, L4n)| using a combinatorial condition based on linking number. A more general result highlighting how to control symmetry groups of hyperbolic links is provided, which has potential for further application.