In this paper, a finite group G with IAut(G) : P(G)I ^- p or pq is determined, where P(G) is the power automorphism group of G, and p, q are distinct primes. Especially, we prove that a finite group G satisfies...In this paper, a finite group G with IAut(G) : P(G)I ^- p or pq is determined, where P(G) is the power automorphism group of G, and p, q are distinct primes. Especially, we prove that a finite group G satisfies |Aut(G) : P(G)|= pq if and only if Aut(G)/P(G) ≌S3. Also, some other classes of finite groups are investigated and classified, which are necessary for the proof of our main results.展开更多
A finite group G is called a generalized PST-group if every subgroup contained in F(G) permutes all Sylow subgroups of G, where F(G) is the Fitting subgroup of G. The class of generalized PST-groups is not subgrou...A finite group G is called a generalized PST-group if every subgroup contained in F(G) permutes all Sylow subgroups of G, where F(G) is the Fitting subgroup of G. The class of generalized PST-groups is not subgroup and quotient group closed, and it properly contains the class of PST-groups. In this paper, the structure of generalized PST-groups is first investigated. Then, with its help, groups whose every subgroup (or every quotient group) is a generalized PST-group are deter- mined, and it is shown that such groups are precisely PST-groups. As applications, T-groups and PT-groups are characterized.展开更多
基金supported by National Natural Science Foundation of China (Grant No. 10771132)SGRC (Grant No. GZ310)+1 种基金Shanghai Leading Academic Discipline Project (Grant No. J50101)Science Technology Foundation of Shanxi Province for Colleges (Grant No. 20081022)
文摘In this paper, a finite group G with IAut(G) : P(G)I ^- p or pq is determined, where P(G) is the power automorphism group of G, and p, q are distinct primes. Especially, we prove that a finite group G satisfies |Aut(G) : P(G)|= pq if and only if Aut(G)/P(G) ≌S3. Also, some other classes of finite groups are investigated and classified, which are necessary for the proof of our main results.
基金The NSF(11071155)of Chinathe Science and Technology Foundation (20081022)of Shanxi Province for Collegesthe Team Innovation Research Foundation of Shanxi University of Finance andEconomics
文摘A finite group G is called a generalized PST-group if every subgroup contained in F(G) permutes all Sylow subgroups of G, where F(G) is the Fitting subgroup of G. The class of generalized PST-groups is not subgroup and quotient group closed, and it properly contains the class of PST-groups. In this paper, the structure of generalized PST-groups is first investigated. Then, with its help, groups whose every subgroup (or every quotient group) is a generalized PST-group are deter- mined, and it is shown that such groups are precisely PST-groups. As applications, T-groups and PT-groups are characterized.
