Minimax group

Definition
A group is said to be a minimax group if it has a subnormal series of finite length such that each successive quotient satisfies either the minimum condition on subgroups (i.e., is an defining ingredient::Artinian group) or the maximum condition on subgroups (i.e., is a defining ingredient::Noetherian group).

Stronger properties

 * Weaker than::Finite group
 * Weaker than::Noetherian group
 * Weaker than::Artinian group

Conjunction with other properties

 * Solvable minimax group is the conjunction with the property of being a solvable group