Small lattices in Lie algebras \(A_{p-1}\) (Q583345)

For the argumentation and notations see the paper by \textit{A. I. Bondal}, \textit{A. I. Kostrikin} and the author [Mat. Sb., Nov. Ser. 130(172), No.4(8), 435-464 (1986; Zbl 0634.10028)]. Some subclass of lattices \(\Gamma\) which arise in connection with the orthogonal decomposition of simple Lie algebras \(A_{p-1}\) (p is prime and \(p\geq 7)\) is considered. All of them occur to be small, i.e. the group Aut(\(\Gamma)\) has only Abelian groups or PSL(2,p) as its composition factors. It is shown that \(\Gamma^{2,\ell}\), \(\Delta^{2,r}\), \(\Delta^{(p-5)/2,r}\), \(\Delta^{(p-3)/2,r}\) are small.