Recognizing by Spectrum for the Automorphism Groups of Sporadic Simple Groups

Abstract

The spectrum of a finite group is the set of its element orders, and two groups are said to be isospectral if they have the same spectra. A finite group G is said to be recognizable by spectrum, if every finite group isospectral with G is isomorphic to G. We prove that if S is any of the sporadic simple groups McL, M12, M22, He, Suz, O'N, then Aut(S) is recognizable by spectrum. This finishes the proof of the recognizability by spectrum of the automorphism groups of all sporadic simple groups, except J2. Furthermore, we show that if G is isospectral with Aut(J2), then either G is isomorphic to Aut(J2), or G is an extension of a 2-group by A8.