English

Low-dimensional representations of the three component loop braid group

Representation Theory 2015-12-09 v1

Abstract

Motivated by physical and topological applications, we study representations of the group LB3\mathcal{LB}_3 of motions of 33 unlinked oriented circles in R3\mathbb{R}^3. Our point of view is to regard the three strand braid group B3\mathcal{B}_3 as a subgroup of LB3\mathcal{LB}_3 and study the problem of extending B3\mathcal{B}_3 representations. We introduce the notion of a \emph{standard extension} and characterize B3\mathcal{B}_3 representations admiting such an extension. In particular we show, using a classification result of Tuba and Wenzl, that every irreducible B3\mathcal{B}_3 representation of dimension at most 55 has a (standard) extension. We show that this result is sharp by exhibiting an irreducible 66-dimensional B3\mathcal{B}_3 representation that has no extensions (standard or otherwise). We obtain complete classifications of (1) irreducible 22-dimensional LB3\mathcal{LB}_3 representations (2) extensions of irreducible 33-dimensional B3\mathcal{B}_3 representations and (3) irreducible LB3\mathcal{LB}_3 representations whose restriction to B3\mathcal{B}_3 has abelian image.

Keywords

Cite

@article{arxiv.1508.00005,
  title  = {Low-dimensional representations of the three component loop braid group},
  author = {Paul Bruillard and Liang Chang and Seung-Moon Hong and Julia Yael Plavnik and Eric C. Rowell and Michael Yuan Sun},
  journal= {arXiv preprint arXiv:1508.00005},
  year   = {2015}
}
R2 v1 2026-06-22T10:23:47.197Z