Omega and agemo subgroup

Last updated August 26, 2023

In mathematics, or more specifically group theory, the omega and agemo subgroups described the so-called "power structure" of a finite p-group. They were introduced in ( Hall 1933 ) where they were used to describe a class of finite p-groups whose structure was sufficiently similar to that of finite abelian p-groups, the so-called, regular p-groups. The relationship between power and commutator structure forms a central theme in the modern study of p-groups, as exemplified in the work on uniformly powerful p-groups.

Definition

The omega subgroups are the series of subgroups of a finite p-group, G, indexed by the natural numbers:

\Omega _{i}(G)=\langle \{g:g^{p^{i}}=1\}\rangle .

The agemo subgroups are the series of subgroups:

\mho ^{i}(G)=\langle \{g^{p^{i}}:g\in G\}\rangle .

When i = 1 and p is odd, then i is normally omitted from the definition. When p is even, an omitted i may mean either i = 1 or i = 2 depending on local convention. In this article, we use the convention that an omitted i always indicates i = 1.

Examples

The dihedral group of order 8, G, satisfies: ℧(G) = Z(G) = [ G, G ] = Φ(G) = Soc(G) is the unique normal subgroup of order 2, typically realized as the subgroup containing the identity and a 180° rotation. However Ω(G) = G is the entire group, since G is generated by reflections. This shows that Ω(G) need not be the set of elements of order p.

The quaternion group of order 8, H, satisfies Ω(H) = ℧(H) = Z(H) = [ H, H ] = Φ(H) = Soc(H) is the unique subgroup of order 2, normally realized as the subgroup containing only 1 and −1.

The Sylow p-subgroup, P, of the symmetric group on p² points is the wreath product of two cyclic groups of prime order. When p = 2, this is just the dihedral group of order 8. It too satisfies Ω(P) = P. Again ℧(P) = Z(P) = Soc(P) is cyclic of order p, but [ P, P ] = Φ(G) is elementary abelian of order p^p−1.

The semidirect product of a cyclic group of order 4 acting non-trivially on a cyclic group of order 4,

K=\langle a,b:a^{4}=b^{4}=1,ba=ab^{3}\rangle ,

has ℧(K) elementary abelian of order 4, but the set of squares is simply { 1, aa, bb }. Here the element aabb of ℧(K) is not a square, showing that ℧ is not simply the set of squares.

Properties

In this section, let G be a finite p-group of order |G| = pⁿ and exponent exp(G) = p^k. Then the omega and agemo families satisfy a number of useful properties.

General properties

Both Ω_i(G) and ℧ⁱ(G) are characteristic subgroups of G for all natural numbers, i.
The omega and agemo subgroups form two normal series:

G = ℧⁰(G) ≥ ℧¹(G) ≥ ℧²(G) ≥ ... ≥ ℧^k−2(G) ≥ ℧^k−1(G) > ℧^k(G) = 1

G = Ω_k(G) ≥ Ω_k−1(G) ≥ Ω_k−2(G) ≥ ... ≥ Ω₂(G) ≥ Ω₁(G) > Ω₀(G) = 1

and the series are loosely intertwined: For all i between 1 and k:

℧ⁱ(G) ≤ Ω_k−i(G), but

℧ⁱ⁻¹(G) is not contained in Ω_k−i(G).

Behavior under quotients and subgroups

If H ≤ G is a subgroup of G and N ⊲ G is a normal subgroup of G, then:

℧ⁱ(H) ≤ H ∩ ℧ⁱ(G)
℧ⁱ(N) ⊲ G
Ω_i(N) ⊲ G
℧ⁱ(G/N) = ℧ⁱ(G)N/N
Ω_i(G/N) ≥ Ω_i(G)N/N

Relation to other important subgroups

Soc(G) = Ω(Z(G)), the subgroup consisting of central elements of order p is the socle, Soc(G), of G
Φ(G) = ℧(G)[G,G], the subgroup generated by all pth powers and commutators is the Frattini subgroup, Φ(G), of G.

Relations in special classes of groups

In an abelian p-group, or more generally in a regular p-group:

|℧ⁱ(G)|⋅|Ω_i(G)| = |G|

[℧ⁱ(G):℧ⁱ⁺¹(G)] = [Ω_i(G):Ω_i+1(G)],

where |H| is the order of H and [H:K] = |H|/|K| denotes the index of the subgroups K ≤ H.

Applications

The first application of the omega and agemo subgroups was to draw out the analogy of regular p-groups with abelian p-groups in ( Hall 1933 ).

Groups in which Ω(G) ≤ Z(G) were studied by John G. Thompson and have seen several more recent applications.

The dual notion, groups with [G,G] ≤ ℧(G) are called powerful p-groups and were introduced by Avinoam Mann. These groups were critical for the proof of the coclass conjectures which introduced an important way to understand the structure and classification of finite p-groups.

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References

Dixon, J. D.; du Sautoy, M. P. F.; Mann, A.; Segal, D. (1991), Analytic pro-p-groups, Cambridge University Press, ISBN 0-521-39580-1, MR 1152800
Hall, Philip (1933), "A contribution to the theory of groups of prime-power order", Proceedings of the London Mathematical Society, 36: 29–95, doi:10.1112/plms/s2-36.1.29
Leedham-Green, C. R.; McKay, Susan (2002), The structure of groups of prime power order, London Mathematical Society Monographs. New Series, vol. 27, Oxford University Press, ISBN 978-0-19-853548-5, MR 1918951
McKay, Susan (2000), Finite p-groups, Queen Mary Maths Notes, vol. 18, University of London, ISBN 978-0-902480-17-9, MR 1802994

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