Leinster group
In mathematics, a Leinster group is a finite group whose order equals the sum of the orders of its proper normal subgroups.[1][2]
The Leinster groups are named after Tom Leinster, a mathematician at the University of Edinburgh, who wrote about them in a paper written in 1996 but not published until 2001.[3] He called them "perfect groups"[3] and later "immaculate groups",[4] but they were renamed as the Leinster groups by De Medts & Maróti (2013) because "perfect group" already had a different meaning (a group that equals its commutator subgroup).[2]
Leinster groups give a group-theoretic way of analyzing the perfect numbers and of approaching the still-unsolved problem of the existence of odd perfect numbers. For a cyclic group, the orders of the subgroups are just the divisors of the order of the group, so a cyclic group is a Leinster group if and only if its order is a perfect number.[2] More strongly, as Leinster proved, an abelian group is a Leinster group if and only if it is a cyclic group whose order is a perfect number.[3] Moreover Leinster showed that dihedral Leinster groups are in one-to-one correspondence with odd perfect numbers, so the existence of odd perfect numbers is equivalent to the existence of dihedral Leinster groups.
Examples
[edit]The cyclic groups whose order is a perfect number are Leinster groups.[3]
It is possible for a non-abelian Leinster group to have odd order; an example of order 355433039577 was constructed by François Brunault.[1][4]
Other examples of non-abelian Leinster groups include certain groups of the form , where is an alternating group and is a cyclic group. For instance, the groups , [4], and [5] are Leinster groups. The same examples can also be constructed with symmetric groups, i.e., groups of the form , such as .[3]
The possible orders of Leinster groups form the integer sequence
It is unknown whether there are infinitely many Leinster groups.
Properties
[edit]- There are no Leinster groups that are symmetric or alternating.[3]
- There is no Leinster group of order p2q2 where p, q are primes.[1]
- No finite semi-simple group is Leinster.[1]
- No p-group can be a Leinster group.[4]
- All abelian Leinster groups are cyclic with order equal to a perfect number.[3]
References
[edit]- ^ a b c d Baishya, Sekhar Jyoti (2014), "Revisiting the Leinster groups", Comptes Rendus Mathématique, 352 (1): 1–6, doi:10.1016/j.crma.2013.11.009, MR 3150758.
- ^ a b c De Medts, Tom; Maróti, Attila (2013), "Perfect numbers and finite groups" (PDF), Rendiconti del Seminario Matematico della Università di Padova, 129: 17–33, doi:10.4171/RSMUP/129-2, MR 3090628.
- ^ a b c d e f g Leinster, Tom (2001), "Perfect numbers and groups" (PDF), Eureka, 55: 17–27, arXiv:math/0104012, Bibcode:2001math......4012L
- ^ a b c d Leinster, Tom (2011), "Is there an odd-order group whose order is the sum of the orders of the proper normal subgroups?", MathOverflow. Accepted answer by François Brunault, cited by Baishya (2014).
- ^ Weg, Yanior (2018), "Solutions of the equation (m! 2)σ(n) = 2n⋅m! where 5 ≤ m", math.stackexchange.com(m! + 2)σ(n) = 2n⋅m! where 5 ≤ m&rft.date=2018&rft.aulast=Weg&rft.aufirst=Yanior&rft_id=https://math.stackexchange.com/q/2872997/407165&rfr_id=info:sid/en.wikipedia.org:Leinster group" class="Z3988">. Accepted answer by Julian Aguirre.