<!-- ------------------------------------------------------------------- --> <!-- --> <!-- intro.xml IdRel documentation Chris Wensley --> <!-- & Anne Heyworth --> <!-- --> <!-- $Id: intro.xml,v 2.05 2008/11/21 gap Exp $ --> <!-- --> <!-- ------------------------------------------------------------------- --> <?xml version="1.0" encoding="ISO-8859-15"?> <!-- <M>Id: intro.xml,v 2.05 Exp <M> --> <Chapter Label="intro"> <Heading>Introduction</Heading> This manual describes the &idrel; (version 2.05) &GAP; package for computing the identities among relators of a group presentation using rewriting, logged rewriting, monoid polynomials, module polynomials and <M>Y</M>-sequences. <P/> The theoretical background for these computations is contained in Brown and Huebschumann <Cite Key="BrHu" />, Brown and Razak Salleh <Cite Key="BrSa" /> and is surveyed in <Cite Key="anne-thesis" />. <P/> &idrel; is primarily designed for the computation of a minimal set of generators for the module of identities among relators. It also contains functions which compute logged rewrite systems for group presentations (and complete them where possible), functions for operations involving elements of monoid rings and functions for operations with elements of right modules over monoid rings. The <M>Y</M>-sequences are used as a <E>rewriting</E> way of representing elements of a free crossed module (products of conjugates of group relators and inverse relators). The package is written entirely in &GAP;4, and requires no compilation. <P/> The package is loaded into &GAP; with the <C>LoadPackage</C> command, and on-line help is available in the usual way. <Example> <![CDATA[ gap> LoadPackage( "idrel" ); gap> ?idrel ]]> </Example> A pdf version of the &idrel; manual is available in the <F>doc</F> directory of the home directory of &idrel;. The information parameter <C>InfoIdRel</C> has default value <C>0</C>. When raised to a higher value, additional information is printed out. &idrel; was originally developed in 1999 using &GAP;3, partially supported by a University of Wales Research Assistantship for the first author, Anne Heyworth. <P/> If you use &idrel; to solve a problem then please send a short email to the second author, to whom bug reports, suggestions and other comments should also be sent. You may reference the package by mentioning <Cite Key="HeWe1" /> and <Cite Key="anne-thesis" />. <P/> The new version (2.05) was required in November 2008 because the Mathematics website at Bangor moved to a different network, and the &idrel; pages moved with it. </Chapter>