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http://dbpedia.org/resource/Classical_involution_theorem
http://dbpedia.org/ontology/abstract Inom matematiken är klassiska involutionssInom matematiken är klassiska involutionssatsen av Aschbacher ett resultat som klassificerar enkla grupper med en klassisk involution och som satisfierar vissa andra, som visar att de är mest över en kropp av udda karakteristik. ) utvidgade klassiska involutionssatsen till . En klassisk involution t av en ändlig grupp G är en involution vars centraliserare har en subnormal delgrupp som innehåller t med kvartenion-Sylow 2-delgrupper.åller t med kvartenion-Sylow 2-delgrupper. , In mathematical finite group theory, the cIn mathematical finite group theory, the classical involution theorem of Aschbacher classifies simple groups with a classical involution and satisfying some other conditions, showing that they are mostly groups of Lie type over a field of odd characteristic. extended the classical involution theorem to groups of finite Morley rank. A classical involution t of a finite group G is an involution whose centralizer has a subnormal subgroup containing t with quaternion Sylow 2-subgroups.ining t with quaternion Sylow 2-subgroups.
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http://dbpedia.org/property/last Aschbacher
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http://dbpedia.org/property/year 1977 , 1980
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rdfs:comment In mathematical finite group theory, the cIn mathematical finite group theory, the classical involution theorem of Aschbacher classifies simple groups with a classical involution and satisfying some other conditions, showing that they are mostly groups of Lie type over a field of odd characteristic. extended the classical involution theorem to groups of finite Morley rank. A classical involution t of a finite group G is an involution whose centralizer has a subnormal subgroup containing t with quaternion Sylow 2-subgroups.ining t with quaternion Sylow 2-subgroups. , Inom matematiken är klassiska involutionssInom matematiken är klassiska involutionssatsen av Aschbacher ett resultat som klassificerar enkla grupper med en klassisk involution och som satisfierar vissa andra, som visar att de är mest över en kropp av udda karakteristik. ) utvidgade klassiska involutionssatsen till . En klassisk involution t av en ändlig grupp G är en involution vars centraliserare har en subnormal delgrupp som innehåller t med kvartenion-Sylow 2-delgrupper.åller t med kvartenion-Sylow 2-delgrupper.
rdfs:label Classical involution theorem , Klassiska involutionssatsen
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