Contents

Idea

The braid group ${\mathrm{Br}}_n$ is the group whose elements are isotopy classes of $n$ 1-dimensional braids running vertically in 3-dimensional Cartesian space, the group operation being their concatenation.

Here a braid with $n$ strands is thought of as $n$ pieces of string joining $n$ points at the top of the diagram with $n$-points at the bottom.

(This is a picture of 3 strand braid.)

We can transform / ‘isotope’ these braid diagrams just as we can transform knot diagrams, again using Reidemeister moves. The ‘isotopy’ classes of braid diagrams form a group in which the composition is obtained by putting one diagram above another.

The identity consists of $n$ vertical strings, so the inverse is obtained by turning a diagram upside down:

This is the inverse of the first 3-braid we saw.

There are useful group presentations of the braid groups. We will return later to the interpretation of the generators and relations in terms of diagrams.

A presentation of ${\mathrm{Br}}_{n+1}$

The Artin braid group, ${\mathrm{Br}}_{n+1}$, defined using $n+1$ strands is a group given by

• generators: $y_i$, $i=1,\dots ,n$;

• relations:

  • $r_{i,j}\equiv y_i{y}_j{y}_i^{-1}{y}_j^{-1}$ for $i+1<j$

  • $r_{i,i+1}\equiv y_i{y}_{i+1}{y}_i{y}_{i+1}^{-1}{y}_i^{-1}{y}_{i+1}^{-1}$ for $1\le i<n$.

Examples

We will look at such groups for small values of $n$.

Related concepts

• braid group statistics

References

Classical references are

• Joan S. Birman, Braids, links, and mapping class groups, Princeton Univ Press, 1974.
• R. H. Fox, L. Neuwirth, The braid groups, Math. Scand. 10 (1962) 119-126, pdf, MR150755

and in addition see

• Wikipedia: Braid group