| Quellcodebibliothek Statistik Leitseite products/Sources/formale Sprachen/GAP/pkg/lpres/doc/ (Algebra von RWTH Aachen Version 4.15.1©) Datei vom 12.6.2024 mit Größe 4 kB |
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<Chapter><Heading>The &lpres; package</Heading>
This package was written by René Hartung in 2009; maintenance has been overtaken by Laurent Bartholdi, who translated the manual to &GAPDoc;. <Section><Heading>Introduction</Heading> In 1980, Grigorchuk <Cite Key="Grigorchuk80"/> gave an example of an infinite, finitely generated torsion group which provided a first explicit counter-example to the General Burnside Problem. This counter-example is nowadays called the <E>Grigorchuk group</E> and was originally defined as a group of transformations of the unit interval which preserve the Lebesgue measure. Beside being a counter-example to the General Burnside Problem, the Grigorchuk group was a first example of a group with an intermediate growth function (see <Cite Key="Grigorchuk83"/>) and was used in the construction of a finitely presented amenable group which is not elementary amenable (see <Cite Key="Grigorchuk98"/>).<P/> The Grigorchuk group is not finitely presentable (see <Cite Key="Grigorchuk99"/>). However, in 1985, Igor Lysenok (see <Cite Key="Lysenok85"/>) determined the following recursive presentation for the Grigorchuk group: <Display>\langle a,b,c,d\mid a^2,b^2,c^2,d^2,bcd,[d,d^a]^{\sigma^n},[d,d^{acaca}]^{\ where <M>\sigma</M> is the homomorphism of the free group over <M>\{a,b,c,d\}</M> which is induced by <M>a\mapsto c^a, b\mapsto d, c\mapsto b</M>, and <M>d\mapsto c</M>. Hence, the infinitely many relators of this recursive presentation can be described in finite terms using powers of the endomorphism <M>\sigma</M>.<P/> In 2003, Bartholdi <Cite Key="Bartholdi03"/> introduced the notion of an <E>L-presentation</E> for presentations of this type; that is, a group presentation of the form <Display>G=\left\langle S \left| Q\cup \bigcup_{\varphi\in\Phi^*} R^\varphi\right.\righ where <M>\Phi^*</M> denotes the free monoid generated by a set of free group endomorphisms <M>\Phi</M>. He proved that various branch groups are finitely L-presented but not finitely presentable and that every free group in a variety of groups satisfying finitely many identities is finitely L-presented (e.g. the Free Burnside- and the Free <M>n</M>-Engel groups).<P/> The &lpres;-package defines new &GAP; objects to work with finitely L-presented groups. The main part of the package is a nilpotent quotient algorithm for finitely L-presented groups; that is, an algorithm which takes as input a finitelyL-presented group <M>G</M> and a positive integer <M>c</M>. It computes a polycyclic presentation for the lower central series quotient <M>G/\gamma_{c+1}(G)</M>. Therefore, a nilpotent quotient algorithm can be used to determine the abelian invariants of the lower central series sections <M>\gamma_c(G)/\gamma_{c+1}(G)</M> and the largest nilpotent quotient of <M>G</M> if it exists.<P/> Our nilpotent quotient algorithm generalizes Nickel's algorithm for finitely presented groups (see <Cite Key="Nickel96"/>) which is implemented in the <Package>NQ</Package>-package; see <Cite Key="nq"/>. In difference to the <Package>NQ</Package>-package, the &lpres;-package is implemented in &GAP; only.<P/> Since finite L-presentations generalize finite presentations, our algorithm also applies to finitely presented groups. It coincides with Nickel's algorithm in this special case. A detailed description of our algorithm can be found in <Cite Key="BEH08"/> or in the diploma thesis <Cite Key="H08"/>. Furthermore the &lpres;-package includes the algorithms of <Cite Key="MR2678952"/> for approximating the Schur multiplier of finitely L-presented groups. <!-- and <Cite Key="EH09"/> for the outer automorphism group --><P/> The &lpres;-package also includes the Reidemeister-Schreier algorithm from <Cite Key="MR2876891"/>. L-presented groups were introduced as a tool to understand self-similar groups such as the Grigorchuk group. As such, &lpres; works in close contact with the package <Package>fr</Package>. See <Cite Key="MR3133711"/> for more on the relationships between L-presented groups and self-similar groups.<P/> Finally, we note that we use the term "algorithm" somewhat loosely: many of the algorithms in this package are in fact semi-algorithms, guaranteed to give a correct answer but not guaranteed to terminate. </Section> </Chapter> ¤ Dauer der Verarbeitung: 0.13 Sekunden (vorverarbeitet) ¤*© Formatika GbR, Deutschland |
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2026-03-28