Difference between revisions of "Schreier system"
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| − | A non-empty subset of a [[Free group|free group]] | + | {{TEX|done}} |
| + | A non-empty subset of a [[Free group|free group]] $F$ with set of generators $S$, satisfying the following condition. Let an element $g\neq 1$ of the Schreier system be represented as a reduced word in the generators of the group: | ||
| − | + | $$g=S_1^{n_1}\ldots S_k^{n_k},$$ | |
and let | and let | ||
| − | + | $$g'=\begin{cases}gS_k,&n_k<0,\\gS_k^{-1},&n_k>0.\end{cases}$$ | |
| − | It is required then, that the element | + | It is required then, that the element $g'$ should also belong to this system (the element $g'$ can be considered as the reduced word obtained from $g$ by deleting its last letter). The element 1 belongs to every Schreier system. |
Introduced by O. Schreier in the 1920s, see [[#References|[1]]]. | Introduced by O. Schreier in the 1920s, see [[#References|[1]]]. | ||
Revision as of 11:45, 19 August 2014
A non-empty subset of a free group $F$ with set of generators $S$, satisfying the following condition. Let an element $g\neq 1$ of the Schreier system be represented as a reduced word in the generators of the group:
$$g=S_1^{n_1}\ldots S_k^{n_k},$$
and let
$$g'=\begin{cases}gS_k,&n_k<0,\\gS_k^{-1},&n_k>0.\end{cases}$$
It is required then, that the element $g'$ should also belong to this system (the element $g'$ can be considered as the reduced word obtained from $g$ by deleting its last letter). The element 1 belongs to every Schreier system.
Introduced by O. Schreier in the 1920s, see [1].
References
| [1] | W.S. Massey, "Algebraic topology: an introduction" , Springer (1977) |
Comments
Of particular interest are Schreier systems which are systems of representations of the cosets of a subgroup. Cf. [a1] for some uses of Schreier systems, such as a proof of the Nielsen–Schreier theorem that subgroups of free groups are free.
References
| [a1] | W. Magnus, A. Karrass, B. Solitar, "Combinatorial group theory: presentations in terms of generators and relations" , Wiley (Interscience) (1966) pp. 93 |
Schreier system. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Schreier_system&oldid=12597