Standard Coxeter Presentations

On this page, we give definitions of the standard Coxeter presentations. We also intend to list many finite examples of them-hopefully all of them.

The groups G^p,q,r

< a, b, c | a² = b² = c² = (ab)^p = (ac)² = (bc)^q = (abc)^r = 1 >

Remark: The isomorphism-type of the group defined by this presentation is independent of the ordering of p, q and r. It has a total length of 10 + 2p + 2q + 3r. Note that G^p,q,2r contains (2, p, q; r) [see below] to index 2. Here, the (2, p, q; r) is on generators ca and ab.

The groups (p, q, r)

< a, b, c | a^p = b^q = c^r = abc = 1 >
or
< a, b | a^p = b^q = (ab)^r = 1 >

Remark: The group obtained is independent of the order of p, q and r. The second presentation is obtained from the first by letting c = (ab)^-1. (Obviously (ab)^r = 1 is equivalent to (ab)^-r = 1.) The former presentation has length 3 + p + q + r and the latter presentation has length p + q + 2r.

The groups (p, q, r; s)

< a, b, c | a^p = b^q = c^r = abc = (cba)^s = 1 >
or
< a, b | a^p = b^q = (ab)^r = [a, b]^s = 1 >

Remark: The group obtained is independent of the order of p, q and r. The second presentation is obtained from the first by letting c = (ab)^-1. (Obviously (ab)^r = 1 is equivalent to (ab)^-r = 1. Also, cba = [b, a] = [a, b]^-1.) The former presentation has length 3 + p + q + r + 3s and the latter presentation has length p + q + 2r + 4s.

The groups (p, q | r, s)

< a, b | a^p = b^q = (ab)^r = (ab^-1)^s = 1 >

Remark: The group obtained is independent of swapping p with q and r with s. This presentation has length p + q + 2r + 2s.

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Last updated 23^rd August, 1997

John N. Bray

Standard Coxeter Presentations

The groups Gp,q,r

The groups (p, q, r)

The groups (p, q, r; s)

The groups (p, q | r, s)

The groups G^p,q,r