@prefix owl: . @prefix dbpedia: . dbpedia:Presentation_of_a_group owl:sameAs . @prefix foaf: . @prefix ns3: . dbpedia:Presentation_of_a_group foaf:page ns3:Presentation_of_a_group . @prefix rdfs: . dbpedia:Presentation_of_a_group rdfs:label "\u7FA4\u7684\u5C55\u793A"@zh , "Pr\u00E9sentation d'un groupe"@fr , "\u0417\u0430\u0434\u0430\u043D\u0438\u0435 \u0433\u0440\u0443\u043F\u043F\u044B"@ru , "Presentation of a group"@en , "Presentaci\u00F3n de grupo"@es , "Presentazione di un gruppo"@it , "\u0417\u0430\u0434\u0430\u043D\u043D\u044F \u0433\u0440\u0443\u043F\u0438"@uk . @prefix dbpprop: . dbpedia:Presentation_of_a_group dbpprop:abstract "\u0412 \u043C\u0430\u0442\u0435\u043C\u0430\u0442\u0438\u043A\u0435, \u043E\u0434\u0438\u043D \u0438\u0437 \u043C\u0435\u0442\u043E\u0434\u043E\u0432 \u043E\u043F\u0440\u0435\u0434\u0435\u043B\u0435\u043D\u0438\u044F \u0433\u0440\u0443\u043F\u043F\u044B \u044D\u0442\u043E \u0437\u0430\u0434\u0430\u043D\u0438\u0435 \u043F\u043E\u0440\u043E\u0436\u0434\u0430\u044E\u0449\u0435\u0433\u043E \u043C\u043D\u043E\u0436\u0435\u0441\u0442\u0432\u0430 S \u0438 \u043C\u043D\u043E\u0436\u0435\u0441\u0442\u0432\u0430 \u0441\u043E\u043E\u0442\u043D\u043E\u0448\u0435\u043D\u0438\u0439 \u043C\u0435\u0436\u0434\u0443 \u043F\u043E\u0440\u043E\u0436\u0434\u0430\u044E\u0449\u0438\u043C\u0438 R. \u0413\u043E\u0432\u043E\u0440\u044F\u0442, \u0447\u0442\u043E \u0433\u0440\u0443\u043F\u043F\u0430 G \u0438\u043C\u0435\u0435\u0442 \u0437\u0430\u0434\u0430\u043D\u0438\u0435 <math>\\langle S \\mid R\\rangle. \\,\\!</math> \u0413\u043E\u0432\u043E\u0440\u044F \u043D\u0435\u0444\u043E\u0440\u043C\u0430\u043B\u044C\u043D\u043E, G \u0438\u043C\u0435\u0435\u0442 \u0432\u044B\u0448\u0435\u0443\u043A\u0430\u0437\u0430\u043D\u043D\u043E\u0435 \u0437\u0430\u0434\u0430\u043D\u0438\u0435, \u0435\u0441\u043B\u0438 \u043E\u043D\u0430 \u00AB\u043D\u0430\u0438\u0431\u043E\u043B\u0435\u0435 \u0441\u0432\u043E\u0431\u043E\u0434\u043D\u0430\u00BB \u0438\u0437 \u0432\u0441\u0435\u0445 \u0433\u0440\u0443\u043F\u043F, \u043F\u043E\u0440\u043E\u0436\u0434\u0430\u0435\u043C\u044B\u0445 S \u0438 \u043F\u043E\u0434\u0447\u0438\u043D\u044F\u044E\u0449\u0438\u043C\u0441\u044F \u0441\u043E\u043E\u0442\u043D\u043E\u0448\u0435\u043D\u0438\u044F\u043C \u043C\u0435\u0436\u0434\u0443 \u044D\u043B\u0435\u043C\u0435\u043D\u0442\u0430\u043C\u0438 S \u0438\u0437 R. \u0424\u043E\u0440\u043C\u0430\u043B\u044C\u043D\u043E, \u0433\u0440\u0443\u043F\u043F\u0430 G \u0438\u043C\u0435\u0435\u0442 \u0442\u0430\u043A\u043E\u0435 \u0437\u0430\u0434\u0430\u043D\u0438\u0435, \u0435\u0441\u043B\u0438 \u043E\u043D\u0430 \u0438\u0437\u043E\u043C\u043E\u0440\u0444\u043D\u0430 \u0444\u0430\u043A\u0442\u043E\u0440\u0433\u0440\u0443\u043F\u043F\u0435 \u0441\u0432\u043E\u0431\u043E\u0434\u043D\u043E\u0439 \u0433\u0440\u0443\u043F\u043F\u044B, \u043F\u043E\u0440\u043E\u0436\u0434\u0451\u043D\u043D\u043E\u0439 S, \u043F\u043E \u043D\u043E\u0440\u043C\u0430\u043B\u044C\u043D\u043E\u0439 \u043F\u043E\u0434\u0433\u0440\u0443\u043F\u043F\u0435, \u043F\u043E\u0440\u043E\u0436\u0434\u0451\u043D\u043D\u043E\u0439 \u0441\u043E\u043E\u0442\u043D\u043E\u0448\u0435\u043D\u0438\u044F\u043C\u0438 R. \u0421\u0430\u043C\u044B\u043C \u043F\u0440\u043E\u0441\u0442\u044B\u043C \u043F\u0440\u0438\u043C\u0435\u0440\u043E\u043C \u0437\u0430\u0434\u0430\u043D\u0438\u044F \u0433\u0440\u0443\u043F\u043F\u044B \u044F\u0432\u043B\u044F\u0435\u0442\u0441\u044F \u0437\u0430\u0434\u0430\u043D\u0438\u0435 \u0446\u0438\u043A\u043B\u0438\u0447\u0435\u0441\u043A\u043E\u0439 \u0433\u0440\u0443\u043F\u043F\u044B \u043F\u043E\u0440\u044F\u0434\u043A\u0430 n: <math>\\langle a \\mid a^n = e\\rangle,\\,\\!</math> \u0433\u0434\u0435 e \u044D\u0442\u043E \u0435\u0434\u0438\u043D\u0438\u0446\u0430 \u0433\u0440\u0443\u043F\u043F\u044B. \u0427\u0430\u0441\u0442\u043E \u0434\u043B\u044F \u043A\u0440\u0430\u0442\u043A\u043E\u0441\u0442\u0438 \u043D\u0435 \u043F\u0438\u0448\u0443\u0442 \u0440\u0430\u0432\u0435\u043D\u0441\u0442\u0432\u043E \u0435\u0434\u0438\u043D\u0438\u0446\u0435: <math>\\langle a \\mid a^n\\rangle,\\,\\!</math> \u041A\u0430\u0436\u0434\u0430\u044F \u0433\u0440\u0443\u043F\u043F\u0430 \u0438\u043C\u0435\u0435\u0442 \u0437\u0430\u0434\u0430\u043D\u0438\u0435 \u0438, \u0431\u043E\u043B\u0435\u0435 \u0442\u043E\u0433\u043E, \u2014 \u043C\u043D\u043E\u0433\u043E \u0440\u0430\u0437\u043B\u0438\u0447\u043D\u044B\u0445 \u0437\u0430\u0434\u0430\u043D\u0438\u0439; \u0437\u0430\u0434\u0430\u043D\u0438\u0435, \u0437\u0430\u0447\u0430\u0441\u0442\u0443\u044E, \u044D\u0442\u043E \u043D\u0430\u0438\u0431\u043E\u043B\u0435\u0435 \u043A\u043E\u043C\u043F\u0430\u043A\u0442\u043D\u044B\u0439 \u0441\u043F\u043E\u0441\u043E\u0431 \u043E\u043F\u0440\u0435\u0434\u0435\u043B\u0435\u043D\u0438\u044F \u0433\u0440\u0443\u043F\u043F\u044B."@ru , "En th\u00E9orie des groupes, un groupe peut se d\u00E9finir par sa pr\u00E9sentation autrement dit la donn\u00E9e d'un ensemble de g\u00E9n\u00E9rateurs et de relations que ceux-ci doivent v\u00E9rifier. La possibilit\u00E9 de cette d\u00E9finition d\u00E9coule de ce que tout groupe s'obtient comme quotient d'un groupe libre. En g\u00E9n\u00E9ral, la pr\u00E9sentation d'un groupe G se note en \u00E9crivant entre crochets la liste de lettres et une liste minimale de mots sur cet alphabet, de la forme : <math>G=<a,b,c,d|cbcbcb, cbc^{-1}b^{-1}, b^9></math> Chaque mot est cens\u00E9 valoir 1 dans le groupe; G est engendr\u00E9 par a, b, c, d; et aucune autre relation n'existe entre les lettres, hormis celles donn\u00E9es dans la pr\u00E9sentation. Par exemple, ici, b est d'ordre 9, cb est d'ordre 3, c et b commute dans c est d'ordre 1, 3 ou 9 et en en fait exactement 9."@fr , "In mathematics, one method of defining a group is by a presentation. One specifies a set S of generators so that every element of the group can be written as a product of some of these generators, and a set R of relations among those generators. We then say G has presentation <math>\\langle S \\mid R\\rangle. \\,\\!</math> Informally, G has the above presentation if it is the \"free-est group\" generated by S subject only to the relations R. Formally, the group G is said to have the above presentation if it is isomorphic to the quotient of a free group on S by the normal subgroup generated by the relations R. As a simple example, the cyclic group of order n has the presentation <math>\\langle a \\mid a^n = e\\rangle. \\,\\!</math> where <math>e</math> is the group identity. This may be written equivalently as <math>\\langle a \\mid a^n\\rangle,\\,\\!</math> since terms that don't include an equals sign are taken to be equal to the group identity. Such terms are called relators, distinguishing them from the relations that include an equals sign. Every group has a presentation, and in fact many different presentations; a presentation is often the most compact way of describing the structure of the group. A closely related but different concept is that of an absolute presentation of a group."@en , "\u0417\u0430\u0434\u0430\u043D\u043D\u044F \u0433\u0440\u0443\u043F\u0438 - \u0432 \u043C\u0430\u0442\u0435\u043C\u0430\u0442\u0438\u0446\u0456 \u0441\u043F\u043E\u0441\u0456\u0431 \u0432\u0438\u0437\u043D\u0430\u0447\u0435\u043D\u043D\u044F \u0433\u0440\u0443\u043F\u0438 \u0437\u0430 \u0434\u043E\u043F\u043E\u043C\u043E\u0433\u043E\u044E \u043C\u043D\u043E\u0436\u0438\u043D\u0438 \u043F\u043E\u0440\u043E\u0434\u0436\u0443\u044E\u0447\u0438\u0445 \u0435\u043B\u0435\u043C\u0435\u043D\u0442\u0456\u0432, \u0442\u0430\u043A\u0438\u0445 \u0449\u043E \u043A\u043E\u0436\u0435\u043D \u0435\u043B\u0435\u043C\u0435\u043D\u0442 \u0433\u0440\u0443\u043F\u0438 \u043C\u043E\u0436\u0435 \u0431\u0443\u0442\u0438 \u0437\u0430\u043F\u0438\u0441\u0430\u043D\u0438\u0439 \u0447\u0435\u0440\u0435\u0437 \u0434\u043E\u0431\u0443\u0442\u043E\u043A \u0446\u0438\u0445 \u0435\u043B\u0435\u043C\u0435\u043D\u0442\u0456\u0432, \u0456 \u043C\u043D\u043E\u0436\u0438\u043D\u0438 \u0441\u043F\u0456\u0432\u0432\u0456\u0434\u043D\u043E\u0448\u0435\u043D\u044C \u043F\u043E\u0440\u043E\u0434\u0436\u0443\u044E\u0447\u0438\u0445 \u0435\u043B\u0435\u043C\u0435\u043D\u0442\u0456\u0432. \u042F\u043A \u043F\u0440\u0430\u0432\u0438\u043B\u043E \u0442\u0430\u043A\u0435 \u0437\u0430\u0434\u0430\u043D\u043D\u044F \u043F\u043E\u0437\u043D\u0430\u0447\u0430\u0454\u0442\u044C\u0441\u044F \u043D\u0430\u0441\u0442\u0443\u043F\u043D\u0438\u043C \u0447\u0438\u043D\u043E\u043C: <math>\\langle T \\mid R\\rangle. \\,\\!</math> \u0417\u0430\u0434\u0430\u043D\u043D\u044F \u0433\u0440\u0443\u043F\u0438 \u0454 \u0434\u0443\u0436\u0435 \u043A\u043E\u043C\u043F\u0430\u043A\u0442\u043D\u0438\u043C \u0456 \u0437\u0440\u0443\u0447\u043D\u0438\u043C \u0441\u043F\u043E\u0441\u043E\u0431\u043E\u043C \u0432\u0438\u0437\u043D\u0430\u0447\u0435\u043D\u043D\u044F \u0433\u0440\u0443\u043F\u0438 \u043F\u0440\u043E\u0442\u0435 \u0456\u0437 \u0437\u0430\u0434\u0430\u043D\u043D\u044F \u0433\u0440\u0443\u043F\u0438 \u0447\u0430\u0441\u0442\u043E \u0432\u0430\u0436\u043A\u043E \u0432\u0441\u0442\u0430\u043D\u043E\u0432\u0438\u0442\u0438 \u043D\u0430\u0432\u0456\u0442\u044C \u043D\u0430\u0439\u043F\u0440\u043E\u0441\u0442\u0456\u0448\u0456 \u0432\u043B\u0430\u0441\u0442\u0438\u0432\u043E\u0441\u0442\u0456 \u0433\u0440\u0443\u043F\u0438, \u0437\u043E\u043A\u0440\u0435\u043C\u0430 \u0447\u0438 \u0454 \u0433\u0440\u0443\u043F\u0430 \u0441\u043A\u0456\u043D\u0447\u0435\u043D\u043D\u043E\u044E, \u043A\u043E\u043C\u0443\u0442\u0430\u0442\u0438\u0432\u043D\u043E\u044E, \u0442\u0440\u0438\u0432\u0456\u0430\u043B\u044C\u043D\u043E\u044E \u0456 \u0442. \u0434. \u041E\u0441\u043E\u0431\u043B\u0438\u0432\u043E \u0447\u0430\u0441\u0442\u043E \u0437\u0430\u0434\u0430\u043D\u043D\u044F \u0433\u0440\u0443\u043F \u0432\u0438\u043A\u043E\u0440\u0438\u0441\u0442\u043E\u0432\u0443\u0454\u0442\u044C\u0441\u044F \u0432 \u043A\u043E\u043C\u0431\u0456\u043D\u0430\u0442\u043E\u0440\u043D\u0456\u0439 \u0456 \u0433\u0435\u043E\u043C\u0435\u0442\u0440\u0438\u0447\u043D\u0456\u0439 \u0442\u0435\u043E\u0440\u0456\u0457 \u0433\u0440\u0443\u043F, \u0430 \u0442\u0430\u043A\u043E\u0436 \u0442\u043E\u043F\u043E\u043B\u043E\u0433\u0456\u0457."@uk , "En matem\u00E1tica, una presentaci\u00F3n es una forma de definir un grupo mediante la especificaci\u00F3n de dos conjuntos: S, conjunto de los generadores, de modo que todo elemento del grupo pueda expresarse como producto de elementos de S. R, conjunto de las relaciones, igualdades entre elementos del grupo. La presentaci\u00F3n de un grupo G suele escribirse en la forma <math>\\langle S|R\\rangle</math>. En las relaciones en que el segundo miembro de la igualdad sea el elemento neutro del grupo, suele omitirse la igualdad y el elemento neutro. Por ejemplo: <math>G=<a,b,c,d|b^9, cbcbcb, cbc^{-1}b^{-1} ></math> indica que el grupo G est\u00E1 generado por a, b, c, d; y el conjunto de relaciones nos indica que b= e, es decir, b es de orden 9, cb es de orden 3, y que c y b conmutan."@es , "\u5728\u6578\u5B78\u4E2D\uFF0C\u5C55\u793A\u662F\u5B9A\u7FA9\u7FA4\u7684\u4E00\u7A2E\u65B9\u6CD5\u3002\u901A\u904E\u6307\u5B9A\u751F\u6210\u5143\u7684\u96C6\u5408 S \u4F7F\u5F97\u9019\u500B\u7FA4\u7684\u6240\u6709\u5143\u7D20\u90FD\u53EF\u4EE5\u5BEB\u70BA\u67D0\u4E9B\u9019\u7A2E\u751F\u6210\u5143\u7684\u4E58\u7A4D\uFF0C\u548C\u9019\u4E9B\u751F\u6210\u5143\u4E4B\u9593\u7684\u95DC\u7CFB\u7684\u96C6\u5408 R\u3002\u7A31 G \u6709\u5C55\u793A <math>\\langle S \\mid R\\rangle</math>\u3002 \u975E\u6B63\u5F0F\u7684\u8AAA\uFF0CG \u6709\u4E0A\u8FF0\u5C55\u793A\u5982\u679C\u5B83\u662F S \u6240\u751F\u6210\u7684\u53EA\u670D\u5F9E\u95DC\u7CFB R \u7684\u201C\u6700\u81EA\u7531\u7684\u7FA4\u201D\u3002\u6B63\u5F0F\u7684\u8AAA\uFF0C\u7FA4 G \u88AB\u7A31\u70BA\u6709\u4E0A\u8FF0\u5C55\u793A\u5982\u679C\u5B83\u540C\u69CB\u65BC S \u4E0A\u7684\u81EA\u7531\u7FA4\u6A21\u4EE5\u95DC\u7CFB R \u751F\u6210\u7684\u6B63\u898F\u5B50\u7FA4\u7684\u5546\u7FA4\u3002 \u4F5C\u70BA\u4E00\u500B\u7C21\u55AE\u7684\u4F8B\u5B50\uFF0Cn \u968E\u5FAA\u74B0\u7FA4\u6709\u5C55\u793A <math>\\langle a \\mid a^n = e\\rangle</math>\u3002 \u9019\u91CC\u7684 <math>e</math> \u662F\u7FA4\u55AE\u4F4D\u5143\u3002\u5B83\u53EF\u4EE5\u7B49\u50F9\u7684\u5BEB\u70BA <math>\\langle a \\mid a^n\\rangle</math>\uFF0C \u56E0\u70BA\u628A\u4E0D\u5305\u62EC\u7B49\u865F\u7684\u9805\u8A8D\u70BA\u662F\u7B49\u4E8E\u7FA4\u55AE\u4F4D\u5143\u3002\u9019\u7A2E\u9805\u53EB\u505A\u95DC\u7CFB\u5143(relator)\uFF0C\u5340\u5225\u65BC\u5305\u62EC\u7B49\u865F\u7684\u95DC\u7CFB\u3002 \u6240\u6709\u7FA4\u90FD\u6709\u4E00\u500B\u5C55\u793A\uFF0C\u5E76\u4E14\u4E8B\u5BE6\u4E0A\u6709\u5F88\u591A\u4E0D\u540C\u7684\u5C55\u793A\uFF1B\u5C55\u793A\u7D93\u5E38\u662F\u63CF\u8FF0\u7FA4\u7D50\u69CB\u7684\u6700\u7C21\u6F54\u65B9\u5F0F\u3002 \u4E00\u500B\u5BC6\u5207\u95DC\u806F\u4F46\u4E0D\u540C\u7684\u6982\u5FF5\u662F\u7FA4\u7684\u7D55\u5C0D\u5C55\u793A\u3002"@zh , "In matematica, una presentazione di un gruppo \u00E8 una particolare definizione ottenuta mediante l'elencazione dei seguenti insiemi: i generatori del gruppo, ovvero degli elementi il cui prodotto combinato da origine a tutti gli elementi del gruppo; le relazioni, ovvero una serie di uguaglianze tra i vari elementi del gruppo."@it ; rdfs:comment ""@zh , "\u0417\u0430\u0434\u0430\u043D\u043D\u044F \u0433\u0440\u0443\u043F\u0438 - \u0432 \u043C\u0430\u0442\u0435\u043C\u0430\u0442\u0438\u0446\u0456 \u0441\u043F\u043E\u0441\u0456\u0431 \u0432\u0438\u0437\u043D\u0430\u0447\u0435\u043D\u043D\u044F \u0433\u0440\u0443\u043F\u0438 \u0437\u0430 \u0434\u043E\u043F\u043E\u043C\u043E\u0433\u043E\u044E \u043C\u043D\u043E\u0436\u0438\u043D\u0438 \u043F\u043E\u0440\u043E\u0434\u0436\u0443\u044E\u0447\u0438\u0445 \u0435\u043B\u0435\u043C\u0435\u043D\u0442\u0456\u0432, \u0442\u0430\u043A\u0438\u0445 \u0449\u043E \u043A\u043E\u0436\u0435\u043D \u0435\u043B\u0435\u043C\u0435\u043D\u0442 \u0433\u0440\u0443\u043F\u0438 \u043C\u043E\u0436\u0435 \u0431\u0443\u0442\u0438 \u0437\u0430\u043F\u0438\u0441\u0430\u043D\u0438\u0439 \u0447\u0435\u0440\u0435\u0437 \u0434\u043E\u0431\u0443\u0442\u043E\u043A \u0446\u0438\u0445 \u0435\u043B\u0435\u043C\u0435\u043D\u0442\u0456\u0432, \u0456 \u043C\u043D\u043E\u0436\u0438\u043D\u0438 \u0441\u043F\u0456\u0432\u0432\u0456\u0434\u043D\u043E\u0448\u0435\u043D\u044C \u043F\u043E\u0440\u043E\u0434\u0436\u0443\u044E\u0447\u0438\u0445 \u0435\u043B\u0435\u043C\u0435\u043D\u0442\u0456\u0432."@uk , "\u0412 \u043C\u0430\u0442\u0435\u043C\u0430\u0442\u0438\u043A\u0435, \u043E\u0434\u0438\u043D \u0438\u0437 \u043C\u0435\u0442\u043E\u0434\u043E\u0432 \u043E\u043F\u0440\u0435\u0434\u0435\u043B\u0435\u043D\u0438\u044F \u0433\u0440\u0443\u043F\u043F\u044B \u044D\u0442\u043E \u0437\u0430\u0434\u0430\u043D\u0438\u0435 \u043F\u043E\u0440\u043E\u0436\u0434\u0430\u044E\u0449\u0435\u0433\u043E \u043C\u043D\u043E\u0436\u0435\u0441\u0442\u0432\u0430 S \u0438 \u043C\u043D\u043E\u0436\u0435\u0441\u0442\u0432\u0430 \u0441\u043E\u043E\u0442\u043D\u043E\u0448\u0435\u043D\u0438\u0439 \u043C\u0435\u0436\u0434\u0443 \u043F\u043E\u0440\u043E\u0436\u0434\u0430\u044E\u0449\u0438\u043C\u0438 R. \u0413\u043E\u0432\u043E\u0440\u044F\u0442, \u0447\u0442\u043E \u0433\u0440\u0443\u043F\u043F\u0430 G \u0438\u043C\u0435\u0435\u0442 \u0437\u0430\u0434\u0430\u043D\u0438\u0435 <math>\\langle S \\mid R\\rangle."@ru , "En matem\u00E1tica, una presentaci\u00F3n es una forma de definir un grupo mediante la especificaci\u00F3n de dos conjuntos: S, conjunto de los generadores, de modo que todo elemento del grupo pueda expresarse como producto de elementos de S. R, conjunto de las relaciones, igualdades entre elementos del grupo. La presentaci\u00F3n de un grupo G suele escribirse en la forma <math>\\langle S|R\\rangle</math>."@es , "In mathematics, one method of defining a group is by a presentation. One specifies a set S of generators so that every element of the group can be written as a product of some of these generators, and a set R of relations among those generators. We then say G has presentation <math>\\langle S \\mid R\\rangle. \\,\\!</math> Informally, G has the above presentation if it is the \"free-est group\" generated by S subject only to the relations R."@en , "En th\u00E9orie des groupes, un groupe peut se d\u00E9finir par sa pr\u00E9sentation autrement dit la donn\u00E9e d'un ensemble de g\u00E9n\u00E9rateurs et de relations que ceux-ci doivent v\u00E9rifier. La possibilit\u00E9 de cette d\u00E9finition d\u00E9coule de ce que tout groupe s'obtient comme quotient d'un groupe libre."@fr , "In matematica, una presentazione di un gruppo \u00E8 una particolare definizione ottenuta mediante l'elencazione dei seguenti insiemi: i generatori del gruppo, ovvero degli elementi il cui prodotto combinato da origine a tutti gli elementi del gruppo; le relazioni, ovvero una serie di uguaglianze tra i vari elementi del gruppo."@it . @prefix skos: . @prefix ns7: . dbpedia:Presentation_of_a_group skos:subject ns7:Combinatorics_on_words , ns7:Combinatorial_group_theory . @prefix ns8: . dbpedia:Presentation_of_a_group dbpprop:hasPhotoCollection ns8:Presentation_of_a_group . dbpprop:disambiguates dbpedia:Presentation_of_a_group . dbpedia:Recursively_presented_group dbpprop:redirect dbpedia:Presentation_of_a_group . dbpedia:Finitely_presented_group dbpprop:redirect dbpedia:Presentation_of_a_group . dbpprop:redirect dbpedia:Presentation_of_a_group . dbpedia:Finitely-presented_group dbpprop:redirect dbpedia:Presentation_of_a_group . dbpedia:Generators_and_relations dbpprop:redirect dbpedia:Presentation_of_a_group . dbpedia:Group_presentation dbpprop:redirect dbpedia:Presentation_of_a_group . dbpedia:Recursively_enumerated_group dbpprop:redirect dbpedia:Presentation_of_a_group . dbpprop:redirect dbpedia:Presentation_of_a_group . dbpedia:Relator dbpprop:redirect dbpedia:Presentation_of_a_group .