On the finite solvable PNC-groups
Abstract
A subgroup H of a finite group G is said to be an NC-subgroup of G, if HG NG (H) =G, where HG denotes the normal closure of H in G. A finite group G is called a PNC-group, if any subgroup of G is an NC-subgroup of G, and G is said to be an ON-group, if for any subgroup H of G, either NG (H)=H,\,HG=G, or H G. In this paper, we firstly investigate the basic properties of solvable PNC-groups, and then give several sufficient conditions for G to be a solvable PNC-group. In the end of this paper, we discover some characterizations for minimal non-ON-groups, ON-groups, non-abelian simple groups whose second maximal subgroups are solvable PNC-groups and groups whose proper (maximal) subgroups are solvable PNC-groups.
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