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http://dbpedia.org/ontology/abstract In group theory, a branch of abstract algeIn group theory, a branch of abstract algebra, extraspecial groups are analogues of the Heisenberg group over finite fields whose size is a prime. For each prime p and positive integer n there are exactly two (up to isomorphism) extraspecial groups of order p1+2n. Extraspecial groups often occur in centralizers of involutions. The ordinary character theory of extraspecial groups is well understood.of extraspecial groups is well understood. , 군론에서, 초특별군(超特別群, 영어: extraspecial group)은 크기가 소수의 거듭제곱이며, 중심이 그 소수 크기의 순환군이며, 중심에 대한 몫군이 그 소수 크기의 순환군들의 직접곱인 유한군이다.
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rdfs:comment In group theory, a branch of abstract algeIn group theory, a branch of abstract algebra, extraspecial groups are analogues of the Heisenberg group over finite fields whose size is a prime. For each prime p and positive integer n there are exactly two (up to isomorphism) extraspecial groups of order p1+2n. Extraspecial groups often occur in centralizers of involutions. The ordinary character theory of extraspecial groups is well understood.of extraspecial groups is well understood. , 군론에서, 초특별군(超特別群, 영어: extraspecial group)은 크기가 소수의 거듭제곱이며, 중심이 그 소수 크기의 순환군이며, 중심에 대한 몫군이 그 소수 크기의 순환군들의 직접곱인 유한군이다.
rdfs:label Extra special group , 초특별군
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