On Huppert's Rho-Sigma Conjecture

Abstract

For an irreducible complex character of the finite group G, let π() denote the set of prime divisors of the degree (1) of . Denote then by (G) the union of all the sets π() and by σ(G) the largest value of |π()|, as runs in Irr(G). The -σ conjecture, formulated by Bertram Huppert in the 80's, predicts that |(G)|≤ 3σ(G) always holds, whereas |(G)|≤ 2σ(G) holds if G is solvable; moreover, O. Manz and T.R. Wolf proposed a "strengthened" form of the conjecture in the general case, asking whether |(G)|≤ 2σ(G)+1 is true for every finite group G. In this paper we study the strengthened -σ conjecture for the class of finite groups having a trivial Fitting subgroup: in this context, we prove that the conjecture is true provided σ(G)≤ 5, but it is false in general if σ(G)≥ 6. Instead, we establish that |(G)|≤ 3σ(G)-4 holds for every finite group with a trivial Fitting subgroup and with σ(G)≥ 6 (this being the right, best possible bound). Also, we improve the up-to-date best bound for the solvable case, showing that we have |(G)|≤ 3σ(G) whenever G belongs to one particular class including all the finite solvable groups.