Isomorph-free maximal subgroup of finite group

Definition
An isomorph-free maximal subgroup of finite group is a subgroup of a finite group satisfying the following equivalent conditions:


 * 1) It is both an defining ingredient::isomorph-free subgroup  (in particular, defining ingredient::isomorph-free subgroup of finite group )and a defining ingredient::maximal subgroup  (in particular, a defining ingredient::maximal subgroup of finite group ) of the whole group.
 * 2) It is both an defining ingredient::isomorph-containing subgroup  and a maximal subgroup of the whole group.
 * 3) It is both a defining ingredient::prehomomorph-contained subgroup  and a maximal subgroup of the whole group.

Stronger properties

 * Weaker than::Isomorph-free maximal subgroup of group of prime power order

Weaker properties

 * Stronger than::Maximal subgroup of finite group
 * Stronger than::Isomorph-free subgroup of finite group