Regular p-group

Definition

• For every a, b in G, there is a c in the derived subgroup H′ of the subgroup H of G generated by a and b, such that a^p · b^p = ^p · c^p.
• For every a, b in G, there are elements c_i in the derived subgroup of the subgroup generated by a and b, such that a^p · b^p = ^p · c₁^p ⋯ c_k^p.
• For every a, b in G and every positive integer n, there are elements c_i in the derived subgroup of the subgroup generated by a and b such that a^q · b^q = ^q · c₁^q ⋯ c_k^q, where q = pⁿ.

  Examples

• Every abelian p-group is regular.
• Every p-group of nilpotency class strictly less than p is regular. This follows from the Hall–Petresco identity.
• Every p-group of order at most p^p is regular.
• Every finite group of exponent p is regular.

• Every nonabelian 2-group is irregular.
• The Sylow p-subgroup of the symmetric group on p² points is irregular and of order p^p+1.

  Properties

• Philip Hall's criteria of regularity of a p-group G: G is regular, if one of the following hold:
• # <; p^p
• # [G′:℧₁| < p^p−1
• # |Ω₁| < p^p−1

  Generalizations

• Powerful p-group
• power closed p-group