English

Almost simple groups as flag-transitive automorphism groups of 2-designs with {\lambda} = 2

Group Theory 2025-02-17 v2 Combinatorics

Abstract

In this article, we study 22-designs with λ=2\lambda=2 admitting a flag-transitive almost simple automorphism group with socle a finite simple exceptional group of Lie type, and we prove that such a 22-design does not exist. In conclusion, we present a classification of 22-designs with λ=2\lambda=2 admitting flag-transitive and point-primitive automorphism groups of almost simple type, which states that such a 22-design belongs to an infinite family of 22-designs with parameter set ((3n1)/2,3,2)((3^n-1)/2,3,2) and X=PSLn(3)X=PSL_n(3) for some n3n\geq 3, or it is isomorphic to the 22-design with parameter set (6,3,2)(6,3,2), (7,4,2)(7,4,2), (10,4,2)(10,4,2), (10,4,2)(10,4,2), (11,5,2)(11,5,2), (28,7,2)(28,7,2), (28,3,2)(28,3,2), (36,6,2)(36,6,2), (126,6,2)(126,6,2) or (176,8,2)(176,8,2).

Keywords

Cite

@article{arxiv.2307.05195,
  title  = {Almost simple groups as flag-transitive automorphism groups of 2-designs with {\lambda} = 2},
  author = {Seyed Hassan Alavi},
  journal= {arXiv preprint arXiv:2307.05195},
  year   = {2025}
}
R2 v1 2026-06-28T11:27:00.672Z