On the Prime Graph Question for Almost Simple Groups with an Alternating Socle
Abstract
Let G be an almost simple group with socle An, the alternating group of degree n. We prove that there is a unit of order pq in the integral group ring of G if and only if there is an element of that order in G provided p and q are primes greater than n3. We combine this with some explicit computations to verify the Prime Graph Question for all almost simple groups with socle An if n ≤ 17.
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