Constructing Thompson representatives via pointed links

Abstract

We extend Jones' construction to obtain a surjective map from the Brown-Thompson group F3 to the set of pointed links up to pointed isotopy. We then introduce an operation on F3, and use it to define a new monoid (F3, ), called the central monoid. Using the extended version of Jones' construction, we obtain a surjective monoid homomorphism from the central monoid to the monoid of pointed links with connected sum. This allows us to introduce a standard form for connected sum representatives in F3, and we extend this construction to a certain family of links by defining disjoint union and linking moves on F3.

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