摘要
A subgroup H of finite group G is called pronormal in G if for every element x of G, H is conjugate to Hx in (H, Hx). A finite group G is called PRN-group if every cyclic subgroup of G of prime order or order 4 is pronormal in G. In this paper, we find all PRN-groups and classify minimal non-PRN-groups (non-PRN-group all of whose proper subgroups are PRN-groups). At the end of the paper, we also classify the finite group G, all of whose second maximal subgroups are PRN-groups.
A subgroup H of finite group G is called pronormal in G if for every element x of G, H is conjugate to Hx in (H, Hx). A finite group G is called PRN-group if every cyclic subgroup of G of prime order or order 4 is pronormal in G. In this paper, we find all PRN-groups and classify minimal non-PRN-groups (non-PRN-group all of whose proper subgroups are PRN-groups). At the end of the paper, we also classify the finite group G, all of whose second maximal subgroups are PRN-groups.
基金
Supported by Natural Science Foundation of China (Grant No. 10871032), Graduate Student Research and Innovation Program of Jiangsu Province (Grant No. CX10B-028Z)
