Harada–Norton group

Basic notions

cyclic
alternating
Lie type
sporadic

In the area of modern algebra known as group theory, the Harada–Norton group HN is a sporadic simple group of order

2¹⁴ · 3⁶ · 5⁶ · 7 · 11 · 19

= 273030912000000

≈ 3×10¹⁴.

History and properties

HN is one of the 26 sporadic groups and was found by Harada (1976) and Norton (1975)).

Its Schur multiplier is trivial and its outer automorphism group has order 2.

HN has an involution whose centralizer is of the form 2.HS.2, where HS is the Higman-Sims group (which is how Harada found it).

The prime 5 plays a special role in the group. For example, it centralizes an element of order 5 in the Monster group (which is how Norton found it), and as a result acts naturally on a vertex operator algebra over the field with 5 elements (Lux, Noeske & Ryba 2008). This implies that it acts on a 133 dimensional algebra over F₅ with a commutative but nonassociative product, analogous to the Griess algebra (Ryba 1996).

The full nomralizer of a 5A element in the Monster group is (D₁₀ × HN).2, so HN centralizes 5 involutions alongside the 5-cycle. These involutions are centralized by the Baby monster group, which therefore contains HN as a subgroup.

Generalized monstrous moonshine

Conway and Norton suggested in their 1979 paper that monstrous moonshine is not limited to the monster, but that similar phenomena may be found for other groups. Larissa Queen and others subsequently found that one can construct the expansions of many Hauptmoduln from simple combinations of dimensions of sporadic groups. To recall, the prime number 5 plays a special role in the group and for HN, the relevant McKay-Thompson series is $T_{5A}(\tau )$ where one can set the constant term a(0) = −6 (OEIS: A007251),

{\begin{aligned}j_{5A}(\tau )&=T_{5A}(\tau )-6\\&=\left({\tfrac {\eta (\tau )}{\eta (5\tau )}}\right)^{6}+5^{3}\left({\tfrac {\eta (5\tau )}{\eta (\tau )}}\right)^{6}\\&={\frac {1}{q}}-6+134q+760q^{2}+3345q^{3}+12256q^{4}+39350q^{5}+\dots \end{aligned}}

and η(τ) is the Dedekind eta function.

Maximal subgroups

Norton & Wilson (1986) found the 14 conjugacy classes of maximal subgroups of HN as follows:

A₁₂
2.HS.2
U₃(8):3
2¹⁺⁸.(A₅ × A₅).2
(D₁₀ × U₃(5)).2
5¹⁺⁴.2¹⁺⁴.5.4
2⁶.U₄(2)
(A₆ × A₆).D₈
2³⁺²⁺⁶.(3 × L₃(2))
5²⁺¹⁺².4.A₅
M₁₂:2 (Two classes, fused by an outer automorphism)
3⁴:2.(A₄ × A₄).4
3¹⁺⁴:4.A₅

References

Harada, Koichiro (1976), "On the simple group F of order 2¹⁴ · 3⁶ · 5⁶ · 7 · 11 · 19", Proceedings of the Conference on Finite Groups (Univ. Utah, Park City, Utah, 1975), Boston, MA: Academic Press, pp. 119–276, MR 0401904
Lux, Klaus; Noeske, Felix; Ryba, Alexander J. E. (2008), "The 5-modular characters of the sporadic simple Harada–Norton group HN and its automorphism group HN.2", Journal of Algebra, 319 (1): 320–335, doi:10.1016/j.jalgebra.2007.03.046, ISSN 0021-8693, MR 2378074
S. P. Norton, F and other simple groups, PhD Thesis, Cambridge 1975.
Norton, S. P.; Wilson, Robert A. (1986), "Maximal subgroups of the Harada-Norton group", Journal of Algebra, 103 (1): 362–376, doi:10.1016/0021-8693(86)90192-4, ISSN 0021-8693, MR 0860712
Ryba, Alexander J. E. (1996), "A natural invariant algebra for the Harada-Norton group", Mathematical Proceedings of the Cambridge Philosophical Society, 119 (4): 597–614, doi:10.1017/S0305004100074454, ISSN 0305-0041, MR 1362942

External links

This page was last edited on 18 April 2024, at 12:28

From Wikipedia, the free encyclopedia

History and properties

Generalized monstrous moonshine

Maximal subgroups

References

External links