Finite Linear Groups of Prime Degree
Canadian journal of mathematics, Tome 21 (1969) no. 1, pp. 1025-1041

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If G is a finite group which has a faithful complex representation of degree nit is said to be a linear group of degree n. It is convenient to consider only unimodular irreducible representations. For n ≦ 4 these groups have been known for a long time. An account may be found in Blichfeldt's book (1). For n= 5 they were determined by Brauer in (4). In (4), many properties of linear groups of prime degree pwere determined for pa prime greater than or equal to 5.In a forthcoming series of papers these results will be extended and the linear groups of degree 7 determined. In the first paper, some general results on linear groups of degree p, p≧ 7, will be given. These results will later beapplied to the prime p = 7.
Wales, David B. Finite Linear Groups of Prime Degree. Canadian journal of mathematics, Tome 21 (1969) no. 1, pp. 1025-1041. doi: 10.4153/CJM-1969-114-0
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