Schreier index formula
Let F be a free group
of finite rank, and let H be a subgroup
(http://planetmath.org/Subgroup) of finite index in F.
By the Nielsen-Schreier theorem, H is free.
The Schreier index formula states that
| rank(H)=|F:H|⋅(rank(F)-1)+1. |
This implies more generally that if G is a group generated by m elements, then any subgroup of index n in G can be generated by at most nm-n+1 elements.
| Title | Schreier index formula |
|---|---|
| Canonical name | SchreierIndexFormula |
| Date of creation | 2013-03-22 13:56:18 |
| Last modified on | 2013-03-22 13:56:18 |
| Owner | yark (2760) |
| Last modified by | yark (2760) |
| Numerical id | 14 |
| Author | yark (2760) |
| Entry type | Theorem |
| Classification | msc 20E05 |
| Related topic | ProofOfNielsenSchreierTheoremAndSchreierIndexFormula |