Representations of the Necklace Braid Group: Topological and Combinatorial Approaches

Abstract

The necklace braid group NBn is the motion group of the n+1 component necklace link Ln in Euclidean R3. Here Ln consists of n pairwise unlinked Euclidean circles each linked to an auxiliary circle. Partially motivated by physical considerations, we study representations of the necklace braid group NBn, especially those obtained as extensions of representations of the braid group Bn and the loop braid group LBn. We show that any irreducible Bn representation extends to NBn in a standard way. We also find some non-standard extensions of several well-known Bn-representations such as the Burau and LKB representations. Moreover, we prove that any local representation of Bn (i.e. coming from a braided vector space) can be extended to NBn, in contrast to the situation with LBn. We also discuss some directions for future study from categorical and physical perspectives.