Groupes lin\'eaires finis permutant deux fois transitivement un ensemble de droites
Abstract
Let n >1 be an integer, and G a doubly transitive subgroup of the symmetric group on X=1,...,n. In this paper we find all linear group representations rho of G on an euclidean vector space V which contains a set of equiangular vector lines GG=< v1>,..., such that : (1) V is generated by v1,...,vn, (2) for all i in X and all g in G, = . Then we illustrate our construction when G=SLd(q), q odd and d > 1.
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