The (p, q, r) -generations of the Chevalley group G₂ (3)

Abstract A finite group G is called (l, m, n) -generated, if it is a quotient group of the triangle group T (l, m, n) =. T (l, m, n) = x, y, z | x l = y m = z n = x y z = 1. In 23, Moori posed the question of finding all the (p, q, r) triples, where p, \ q p, q and r are prime numbers, such that a non-abelian finite simple group G is a (p, q, r) -generated. In answering this question, we establish all the (p, q, r) -generations for the group G₂ (3). G 2 (3). We mainly used the structure constant method together with other results to establish the generation and non-generation of the G₂ (3) G 2 (3) by the triples (p, q, r). The Groups, Algorithms and Programming, GAP 21 and the Atlas of finite group representations 27 are used in our computations.