ECD condition

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This article defines a subgroup metaproperty: a property that can be evaluated to true/false for any subgroup property
View a complete list of subgroup metaproperties
View subgroup properties satisfying this metaproperty| View subgroup properties dissatisfying this metaproperty
VIEW RELATED: subgroup metaproperty satisfactions| subgroup metaproperty dissatisfactions

Definition

Definition with symbols

A subgroup property p is said to satisfy the ECD condition if the following are true:

  • Existence (E): Every group has a subgroup satisfying p (this is the same as being right-realized
  • Domination (D): Every subgroup with property p is contained in a subgroup maximal with respect to having the property p.
  • Conjugacy (C): Any two subgroups maximal with respect to having the property p are conjugate to each other.

Often, we refer to ECD conditions not for a general subgroup property but for a subgroup property with respect to certain particular groups or with respect to groups with additional structure.

For a pair of group properties

Given a group property p and a group property q, we say that p satisfied the ECD condition for groups with property q, if in groups with property q, the subgroup property corresponding to p satisfies ECD condition.

Here, by subgroup property corresponding to group property we mean the property of being a subgroup, that as an abstract group, satisfies the group property.

Examples

Groups of prime power order and Sylow subgroups

In a finite group, the group property of being a group of prime power order for a fixed prime is an ECD-property, and the maximal operator applied to this yields the property of being a Sylow subgroup. The proof of this is the content of Sylow's theorem.