A REIDEMEISTER-SCHREIER THEOREM FOR FINITELY L-PRESENTED GROUPS

Year 2012, Volume: 11 Issue: 11, 125 - 159, 01.06.2012

René Hartung

Abstract

We prove a variant of the well-known Reidemeister-Schreier Theorem
for finitely L-presented groups. More precisely, we prove that each finite
index subgroup of a finitely L-presented group is itself finitely L-presented.
Our proof is constructive and it yields a finite L-presentation for the subgroup.
We further study conditions on a finite index subgroup of an invariantly finitely
L-presented group to be invariantly L-presented itself.

Keywords

Reidemeister-Schreier Theorem, infinite presentations, recursive presentations, self-similar groups, Basilica group, Grigorchuk group, finite index subgroups

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• Mathematisches Institut
• Georg-August Universit¨at zu G¨ottingen Bunsenstraße 3–5
• G¨ottingen, Germany
• e-mail: rhartung@uni-math.gwdg.de