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| Paper IPM / M / 8393 |
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| Abstract: | |
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The degree pattern of a finite group G is introduced in
[10] and it is proved that the following simple groups are
uniquely determined by their degree patterns and orders: all
sporadic simple groups, alternating groups Ap (p ≥ 5 is a
twin prime) and some simple groups of Lie type. In this paper, we
continue this investigation. In particular, we show that the
automorphism groups of sporadic simple groups (except Aut(J2)
and Aut(McL)), all simple C22-groups, the alternating
groups Ap, Ap+1, Ap+2 and the symmetric groups Sp,
Sp+l, where p is a prime, are also uniquely determined by
their degree patterns and orders.
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