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In mathematics, the classification of finite simple groups states that every finite simple group is cyclic, or alternating, or in one of 16 families of groups of Lie type, or one of 26 sporadic groups. The list below gives all finite simple groups, together with their order, the size of the Schur multiplier, the size of the outer automorphism group, usually some small representations, and lists of all duplicates.

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  • قائمة الزمر المنتهية البسيطة (ar)
  • Liste des groupes finis simples (fr)
  • List of finite simple groups (en)
  • 유한단순군의 목록 (ko)
  • Lijst van eindige enkelvoudige groepen (nl)
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  • في الرياضيات، تصنيف الزمر المنتهية البسيطة ينص على أن كل زمرة بسيطة منتهية هي إما دائرية أو متناوبة أو واحدة من الأنواع الستة عشر من زمرة لاي أو واحدة من الستة والعشرين. (ar)
  • In mathematics, the classification of finite simple groups states that every finite simple group is cyclic, or alternating, or in one of 16 families of groups of Lie type, or one of 26 sporadic groups. The list below gives all finite simple groups, together with their order, the size of the Schur multiplier, the size of the outer automorphism group, usually some small representations, and lists of all duplicates. (en)
  • 유한단순군(finite simple group)이란 단순군으로서 유한 개의 원소만을 가지는 군을 뜻한다. 와 존 G. 톰프슨이 증명한 를 포함한 수많은 수학자들의 노력에 의해서 모든 유한단순군들의 분류가 이루어졌다. 이 결과는 20세기 수학의 많은 결과들 중 가장 중요하고 위대한 업적들 중 하나이다. (ko)
  • En mathématiques, la classification des groupes finis simples établit que chacun de ces groupes est : * soit cyclique, * soit alterné, * soit membre d'une des seize familles de groupes de type de Lie (incluant le groupe de Tits), * soit l'un des 26 groupes sporadiques (le groupe de Tits est parfois inclus dans les groupes de type de Lie, d'autres fois dans les groupes sporadiques). (fr)
  • In de groepentheorie, een deelgebied van de wiskunde, stelt de classificatie van eindige enkelvoudige groepen dat elke eindige enkelvoudige groep tot en van de volgende klassen behoort: * cyclische groepen * alternerende groepen * de 16 families van groepen van het Lie-type (met inbegrip van de Tits-groep , die strikt genomen niet van het Lie-type is) * de 26 sporadische groepen. Notatie (nl)
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