On p-groups with automorphism groups related to the Chevalley group G2(p)

Abstract

Let p be an odd prime. We construct a p-group P of nilpotency class two, rank seven and exponent p, such that Aut(P) induces NGL(7,p)(G2(p)) = Z(GL(7,p)) G2(p) on the Frattini quotient P/(P). The constructed group P is the smallest p-group with these properties, having order p14, and when p = 3, our construction gives two nonisomorphic p-groups. To show that P satisfies the specified properties, we study the action of G2(q) on the octonion algebra over Fq, for each power q of p, and explore the reducibility of the exterior square of each irreducible seven-dimensional Fq[G2(q)]-module.