Let φ be a homomorphism from a group H to a group Aut(N). Denote by Hφ× N the semidirect product of N by H with homomorphism φ. This paper proves that: Let G be a finite nonsolvable group. If G has exactly ...Let φ be a homomorphism from a group H to a group Aut(N). Denote by Hφ× N the semidirect product of N by H with homomorphism φ. This paper proves that: Let G be a finite nonsolvable group. If G has exactly 40 maximal order elements, then G is isomorphic to one of the following groups: (1) Z4φ×A5, kerφ = Z2; (2) D8φ ×A5, kerφ = Z2 ×Z2; (3) G/N = S5, N = Z(G) = Z2; (4) G/N = S5, N = Z2 ×Z2, N∩Z(G) = Z2.展开更多
基金the Natural of Chongqing Three Gorge University(No.2007-sxxyyb-01)
文摘Let φ be a homomorphism from a group H to a group Aut(N). Denote by Hφ× N the semidirect product of N by H with homomorphism φ. This paper proves that: Let G be a finite nonsolvable group. If G has exactly 40 maximal order elements, then G is isomorphic to one of the following groups: (1) Z4φ×A5, kerφ = Z2; (2) D8φ ×A5, kerφ = Z2 ×Z2; (3) G/N = S5, N = Z(G) = Z2; (4) G/N = S5, N = Z2 ×Z2, N∩Z(G) = Z2.
